Main / Mechanics and Mathematics / Mathematics / Серовайский Семен Яковлевич
Серовайский Семен Яковлевич
Position Профессоp
First higher education
| Educational institution | Квалификация | Expiration date |
|---|---|---|
| КазНУ им. аль-Фараби | Высшее | 1976 |
Academic degree
Academic rank
| Name of academic title | Date of assignment |
|---|---|
| Профессор | 21/06/1996 |
State Prizes
| Prize Name | Date of award |
| Почетная грамота Министерства образования и науки РК "За большой вклад в процветании Казахстана" | |
| Знак "За заслуги в развитии науки Республики Казахстан" |
| File name | Headline | Description |
|---|---|---|
Variation Calculus and Optimization Methods |
Differentiation of functionals new
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Variation Calculus and Optimization Methods |
Inverse problems for parabolic equations
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Variation Calculus and Optimization Methods |
Variational problems with isoperimetric conditions
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Variation Calculus and Optimization Methods |
Variational problems with isoperimetric conditions
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Variation Calculus and Optimization Methods |
Optimization control problem for the vector case
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Variation Calculus and Optimization Methods |
Bolza Problem
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Variation Calculus and Optimization Methods |
Euler equation
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Variation Calculus and Optimization Methods |
Existence and uniqueness
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Variation Calculus and Optimization Methods |
Gradient methods
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Variation Calculus and Optimization Methods |
midterm
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Variation Calculus and Optimization Methods |
Syllabus
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Variation Calculus and Optimization Methods |
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Variation Calculus and Optimization Methods |
Calculus of variations and optimization methods. UMK
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Variation Calculus and Optimization Methods |
Calculus of variations and optimization methods. Syllabus
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Variation Calculus and Optimization Methods |
Вариационные методы Силлабус
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Variation Calculus and Optimization Methods |
Calculus of variations UMK
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Variation Calculus and Optimization Methods |
Calculus of variations UMK
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Variation Calculus and Optimization Methods |
Calculus of variations Syllabus
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Inverse Stochastic Differential Systems Problems |
ntroduction
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Inverse Stochastic Differential Systems Problems |
Tasks new
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Inverse Stochastic Differential Systems Problems |
Inverse problems. Questions
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Inverse Stochastic Differential Systems Problems |
Minimization of functions
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Inverse Stochastic Differential Systems Problems |
Abstract optimization control
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Inverse Stochastic Differential Systems Problems |
Well-posedness of the problems
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Inverse Stochastic Differential Systems Problems |
Midterm
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Inverse Stochastic Differential Systems Problems |
Differential games Syllabus
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Inverse Stochastic Differential Systems Problems |
Inverse problems Syllabus
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Inverse Stochastic Differential Systems Problems |
Inverse problems UMK
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Inverse Stochastic Differential Systems Problems |
Inverse problems UMK
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Inverse Stochastic Differential Systems Problems |
Inverse problems Syllabus
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Syllabus
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Inverse problems for parabolic equations
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Introduction
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Minimization of functionals
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Abstract optimization control
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Stationary inverse problem
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Well-posedness of the problems
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Minimization of functions
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Differentiation of functionals
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Numerical Methods for Solving Optimal Control Problems |
Synopsis
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Numerical Methods for Solving Optimal Control Problems |
Additional example
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Numerical Methods for Solving Optimal Control Problems |
Additional example
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Numerical Methods for Solving Optimal Control Problems |
Numerical methods for the optimization control problems UMK
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Numerical Methods for Solving Optimal Control Problems |
Numerical methods for the optimization control problems Syllabus
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Numerical Methods for Solving Optimal Control Problems |
Tasks
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Numerical Methods for Solving Optimal Control Problems |
Introduction
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Numerical Methods for Solving Optimal Control Problems |
Optimization and sufficiently
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Numerical Methods for Solving Optimal Control Problems |
Singular control
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Numerical Methods for Solving Optimal Control Problems |
Solvability of the optimazation problem
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Numerical Methods for Solving Optimal Control Problems |
Existence of the optimal control
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Numerical Methods for Solving Optimal Control Problems |
Tihinov's well-posedness
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Numerical Methods for Solving Optimal Control Problems |
Hadamard's well-posedness
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Numerical Methods for Solving Optimal Control Problems |
Extremal bifurcation
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Numerical Methods for Solving Optimal Control Problems |
Isoperimetric condition
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Dictionary
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Example 9
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Example 10
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Example 11
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Example 12
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References
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Syllabus Direct methods of solving difference equations
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Tasks
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Introduction
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Example 1
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Example 3
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Example 5
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Example 4
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Example 6
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Example 7
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Example 8
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History of Mathematics |
Seminars for the course Differentiation and optimization
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History of Mathematics |
Seminars for the course "Sequential model of mathematical phisics problems"
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History of Mathematics |
UMK for the course "Sequential models of mathematical physics problems"
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History of Mathematics |
Syllabus for the course Optimization and differentiation
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History of Mathematics |
Syllabus for the course History of Mathematics
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History of Mathematics |
Syllabus for the course Sequential model of mathematical phisics problems
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History of Mathematics |
Syllabus for the course "Sequential models of mathematical physics problems"
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History of Mathematics |
Individuak works for the course Differentiation and optimization
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History of Mathematics |
Syllabus for the course "History of mathematics"
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History of Mathematics |
Individual work for the course Sequential models of mathematical physics problems
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Practical Course of the Optimization Control Theory |
Syllabus
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Sequential Models of Mathematical Physics |
Syllabus
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Sequential Models of Mathematical Physics |
Sequential models of mathematical physics. Syllabus
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Sequential Models of Mathematical Physics |
Sequential models of mathematical physics. UMK
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Sequential Models of Mathematical Physics |
Classic models of mathematical physics
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Generalized Functions and Their Applications |
Additions
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Generalized Functions and Their Applications |
Distributions
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Generalized Functions and Their Applications |
Generalized solutions
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Generalized Functions and Their Applications |
Generalized functions Syllabus
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Generalized Functions and Their Applications |
Generalized functions Syllabus
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Generalized Functions and Their Applications |
UMK Generalized functions
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Generalized Functions and Their Applications |
Classic models and classic functions
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Generalized Functions and Their Applications |
Generalized models and generalised functions
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Generalized Functions and Their Applications |
Convegence
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Generalized Functions and Their Applications |
Completion
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Generalized Functions and Their Applications |
Distributions
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Generalized Functions and Their Applications |
Generalised functions and optimization
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Generalized Functions and Their Applications |
Sequential distributions
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Generalized Functions and Their Applications |
Conclusions
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Generalized Functions and Their Applications |
Conclusions
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Development of Algorithms for Optimal Control of Spacecraft |
Gradient methods
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Development of Algorithms for Optimal Control of Spacecraft |
Optimization control problem with fixed final state
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Development of Algorithms for Optimal Control of Spacecraft |
Development of the algorithms for the optimal control of the spacecraft UMK
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Development of Algorithms for Optimal Control of Spacecraft |
Development of the algorithms for the optimal control of the spacecraft Syllabus
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Development of Algorithms for Optimal Control of Spacecraft |
Tasks
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Development of Algorithms for Optimal Control of Spacecraft |
Tasks
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Development of Algorithms for Optimal Control of Spacecraft |
Introduction
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Development of Algorithms for Optimal Control of Spacecraft |
Minimization of functions
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Development of Algorithms for Optimal Control of Spacecraft |
Differentiation of functionals
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Development of Algorithms for Optimal Control of Spacecraft |
Minimization of functionals
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Development of Algorithms for Optimal Control of Spacecraft |
Abstract optimization control
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Development of Algorithms for Optimal Control of Spacecraft |
Ordinary differential equations
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Development of Algorithms for Optimal Control of Spacecraft |
Stationary inverse problem
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Development of Algorithms for Optimal Control of Spacecraft |
Well-posedness of the problems
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Development of Algorithms for Optimal Control of Spacecraft |
Inverse problems for parabolic equations
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Variational Methods |
Минимизация функций
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Variational Methods |
Уравнение Эйлера
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Variational Methods |
Вариационные методы УМК
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Variational Methods |
Вариационные методы Силлабус
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Variational Methods |
Введение
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Variational Methods |
Минимизация функций
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Variational Methods |
Уравнение Эйлера для задачи Лагранжа
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Variational Methods |
Задача Лагранжа для семейства функций
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Variational Methods |
midterm
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Boundary Optimal Control Problem |
Boundary optimization control problems Syllabus
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Differential Games |
Existence and uniqueness
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Differential Games |
Gradient methods
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Differential Games |
Differential games Syllabus
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Differential Games |
Differential games UMK
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Differential Games |
Minimization of the functions
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Differential Games |
Euler equation
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Differential Games |
Минимизация функций
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Differential Games |
Уравнение Эйлера
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Differential Games |
Уравнение Эйлера
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Differential Games |
Differentiation of functionals
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Differential Games |
Abstract optimization control
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Differential Games |
Minimization of functionals
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Differential Games |
Stationary inverse problem
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Differential Games |
Inverse problems for parabolic equations
|
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Differential Games |
Well-posedness of the problems
|
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Differential Games |
Midterm questions
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Modern Problems of the Theory of Mathematical Physics |
Mathematical physics Syllabus
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Modern Problems of the Theory of Mathematical Physics |
Minimization of the functions. Seminar
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Modern Problems of the Theory of Mathematical Physics |
Gradient methods. Seminar
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Modern Problems of the Theory of Mathematical Physics |
Euler equation
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Modern Problems of the Theory of Mathematical Physics |
Miximum principle
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Modern Problems of the Theory of Mathematical Physics |
Introduction
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Modern Problems of the Theory of Mathematical Physics |
Minimization of functions
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Modern Problems of the Theory of Mathematical Physics |
Differentiation of functionals
|
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Modern Problems of the Theory of Mathematical Physics |
Abstract optimization control
|
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Modern Problems of the Theory of Mathematical Physics |
Inverse problems for ordinary differential equations
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Modern Problems of the Theory of Mathematical Physics |
Stationary inverse problems
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Modern Problems of the Theory of Mathematical Physics |
Minimization of functionals
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Modern Problems of the Theory of Mathematical Physics |
Minimization of functionals
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Modern Problems of the Theory of Mathematical Physics |
Inverse problems for parabolic equations
|
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Modern Problems of the Theory of Mathematical Physics |
Midterm questions
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Modern Problems of the Theory of Mathematical Physics |
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Numerical Methods Control of Optimal Tasks |
Bibliography
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Numerical Methods Control of Optimal Tasks |
Introduction
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Numerical Methods Control of Optimal Tasks |
Example 1
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Numerical Methods Control of Optimal Tasks |
Example 2
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Numerical Methods Control of Optimal Tasks |
Example 3
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Numerical Methods Control of Optimal Tasks |
Example 4
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Numerical Methods Control of Optimal Tasks |
Example 5
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Numerical Methods Control of Optimal Tasks |
Example 6
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Numerical Methods Control of Optimal Tasks |
Example 7
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Numerical Methods Control of Optimal Tasks |
Example 8
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Numerical Methods Control of Optimal Tasks |
Numerical methods Syllabus
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Numerical Methods Control of Optimal Tasks |
Tasks
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Numerical Methods Control of Optimal Tasks |
Introduction
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Numerical Methods Control of Optimal Tasks |
Example 1
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Numerical Methods Control of Optimal Tasks |
Example 2
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Numerical Methods Control of Optimal Tasks |
Example 3
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Numerical Methods Control of Optimal Tasks |
Example 4
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Numerical Methods Control of Optimal Tasks |
Example 6
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Numerical Methods Control of Optimal Tasks |
Example 6
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Numerical Methods Control of Optimal Tasks |
Example 7
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Numerical Methods Control of Optimal Tasks |
Example 8
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Numerical Methods Control of Optimal Tasks |
Tickets
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Numerical Methods Control of Optimal Tasks |
Midtern
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Variation Calculus and Optimization Methods |
Calculus of variations and optimization methods. Syllabus
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Variation Calculus and Optimization Methods |
minimization of functions
|
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Variation Calculus and Optimization Methods |
midterm
|
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Variation Calculus and Optimization Methods |
Euler equation
|
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Variation Calculus and Optimization Methods |
Questions for examination
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Variation Calculus and Optimization Methods |
midterm
|
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Variation Calculus and Optimization Methods |
УМК
|
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Generalized Functions and Their Applications |
обобщенные функции
|
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Generalized Functions and Their Applications |
Tasks
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Generalized Functions and Their Applications |
Generalized functions. Syllabus
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Generalized Functions and Their Applications |
Generalized functions. Syllabus
|
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Generalized Functions and Their Applications |
Задания
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Methods of Тeaching Higher Education Mathematics |
References
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Methods of Тeaching Higher Education Mathematics |
Course Structure
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Methods of Тeaching Higher Education Mathematics |
Dictionary
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Methods of Тeaching Higher Education Mathematics |
Teaching method syllabus
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Methods of Тeaching Higher Education Mathematics |
Tasks
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Methods of Тeaching Higher Education Mathematics |
Recomendations
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Methods of Тeaching Higher Education Mathematics |
Homework
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Methods of Тeaching Higher Education Mathematics |
Introduction
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Methods of Тeaching Higher Education Mathematics |
Language
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Methods of Тeaching Higher Education Mathematics |
Numbers
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Methods of Тeaching Higher Education Mathematics |
Ordered sets.
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Methods of Тeaching Higher Education Mathematics |
Algebraic objects
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Methods of Тeaching Higher Education Mathematics |
Topological objects
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Methods of Тeaching Higher Education Mathematics |
Topological objects
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Methods of Тeaching Higher Education Mathematics |
Measerable objects
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Methods of Тeaching Higher Education Mathematics |
Synthesis
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Methods of Тeaching Higher Education Mathematics |
Mixed objects
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Methods of Тeaching Higher Education Mathematics |
Midtern
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Differential Games |
Example 10
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Differential Games |
Differential games syllabus
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Differential Games |
Example 9
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Differential Games |
Tasks
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Differential Games |
Introduction
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Differential Games |
Example 1
|
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Differential Games |
Example 2
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Differential Games |
Example 3
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Differential Games |
Example 4
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Differential Games |
Example 5
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Differential Games |
Example 6
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Differential Games |
Example 6
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Differential Games |
Example 7
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Differential Games |
Example 8
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Differential Games |
Midtern
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Modern Problems of the Theory of Mathematical Physics |
Классическое решение задач математической физики
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Modern Problems of the Theory of Mathematical Physics |
Проблема сходимости в задачах математической физики
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Modern Problems of the Theory of Mathematical Physics |
Принцип пополнения
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Modern Problems of the Theory of Mathematical Physics |
Теория распределений и ее приложения
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Modern Problems of the Theory of Mathematical Physics |
Секвенциальный метод в математической физике
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Modern Problems of the Theory of Mathematical Physics |
Обобщенное решение задач математической физики
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Modern Problems of the Theory of Mathematical Physics |
Mathematical physics. Syllabus
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Modern Problems of the Theory of Mathematical Physics |
Tasks
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Modern Problems of the Theory of Mathematical Physics |
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Modern Problems of the Theory of Mathematical Physics |
Classical solutions of the mathematical physics problems
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Modern Problems of the Theory of Mathematical Physics |
Generalized solutions of the mathematical physics problems
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Modern Problems of the Theory of Mathematical Physics |
Convegence of methods of the analysis
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Modern Problems of the Theory of Mathematical Physics |
The problem of the comoletions
|
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Modern Problems of the Theory of Mathematical Physics |
The distibutions theory
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Modern Problems of the Theory of Mathematical Physics |
The applications to the optimization theory
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Modern Problems of the Theory of Mathematical Physics |
sequaential form of mathematical physics problems
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Modern Problems of the Theory of Mathematical Physics |
Обобщенное решение задач математической физики
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Variation Calculus and Optimization Methods |
Силлабус
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Sequential Models of Mathematical Physics |
силлабус
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The Implementation of a Doctoral Thesis |
модель
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Differential Games |
силлабус
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Actual problems of the fundamental areas of mahtematics |
СРС
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Actual problems of the fundamental areas of mahtematics |
силлабус
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Actual problems of the fundamental areas of mahtematics |
Tasks
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Actual problems of the fundamental areas of mahtematics |
Introduction
|
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Actual problems of the fundamental areas of mahtematics |
Minimization of functions
|
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Actual problems of the fundamental areas of mahtematics |
Differentiation of functionals
|
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Actual problems of the fundamental areas of mahtematics |
Minimization of functionals
|
|
Actual problems of the fundamental areas of mahtematics |
Stationary conditions and variational inequalities
|
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Actual problems of the fundamental areas of mahtematics |
Abstract optimization control
|
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Actual problems of the fundamental areas of mahtematics |
Ordinary differential equations
|
|
Actual problems of the fundamental areas of mahtematics |
Stationary inverse problem
|
|
Actual problems of the fundamental areas of mahtematics |
Stationary inverse problem
|
|
Actual problems of the fundamental areas of mahtematics |
Stationary inverse problem
|
|
Actual problems of the fundamental areas of mahtematics |
Well-posedness of the problems
|
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Actual problems of the fundamental areas of mahtematics |
Inverse problems for parabolic equations
|
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Mathematical Physics Equations |
Tasks
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Mathematical Physics Equations |
Программа курса
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Mathematical Physics Equations |
Tasks
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Mathematical Physics Equations |
Серовайский С.Я._карта обесп_EqMathPhys_math_2019
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Mathematical Physics Equations |
Силлабус
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Mathematical Physics Equations |
Силлабус
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Mathematical Physics Equations |
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Mathematical Physics Equations |
Tasks
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Mathematical Physics Equations |
Task
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Mathematical Physics Equations |
Tasks
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Mathematical Physics Equations |
Tasks
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Mathematical Physics Equations |
Inverse problems of mathematical physics
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Mathematical Physics Equations |
Classification of second order partial differential equations
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Mathematical Physics Equations |
Cauchy problem for the vibrating string equation
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Mathematical Physics Equations |
Oscillation of the string with fixed ends
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Mathematical Physics Equations |
Oscillation of the string equation with free ends
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Mathematical Physics Equations |
Heat transfer with known temperature at the boundary
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Mathematical Physics Equations |
Heat transfer for the boundary isolated body
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Mathematical Physics Equations |
Introduction
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Mathematical Physics Equations |
Forced oscillation of the string
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Mathematical Physics Equations |
10 Heat transfer under the heat sources
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Mathematical Physics Equations |
2 Mathematical models
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Mathematical Physics Equations |
Electrostatic field equation in a circle
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Mathematical Physics Equations |
Green functions method for the Laplace and Poisson equations
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Mathematical Physics Equations |
Finite difference method for mathematical physics problems
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Mathematical Physics Equations |
Midterm
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Integral Equations |
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Integral Equations |
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Integral Equations |
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Variation Calculus and Optimization Methods |
Variation Calculus Syllabus
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Variation Calculus and Optimization Methods |
Final control program
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Mathematical Modeling |
С. Серовайский. Математическое моделирование
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Mathematical Modeling |
Mathematical modelling Syllabus
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Mathematical Modeling |
Силлабус Математическое моделирование
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Mathematical Modeling |
Mathematical modelling. Syllabus
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Mathematical Modeling |
Силлабус Математическое моделирование.
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Mathematical Modeling |
Mathematical modelling Tasks
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Mathematical Modeling |
Моделирование Методические указания
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Mathematical Modeling |
Mathematical modelling Homework
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Mathematical Modeling |
Моделирование Задания на СРС
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Mathematical Modeling |
Моделирование 01 Введение Лекция
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Mathematical Modeling |
Моделирование 02 Механические колебания
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Mathematical Modeling |
Моделирование 03 Электрические колебания Лекция
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Mathematical Modeling |
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Mathematical Modeling |
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Mathematical Modeling |
Силлабус Математическое моделирование
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Inverse Stochastic Differential Systems Problems |
syllabus
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Inverse Stochastic Differential Systems Problems |
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Inverse Stochastic Differential Systems Problems |
Introduction
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Inverse Stochastic Differential Systems Problems |
Well-posedness of the problems
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Inverse Stochastic Differential Systems Problems |
Inverse problems for parabolic equations
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Optimization Methods |
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Optimization Methods |
practical works
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Optimization Methods |
homework
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Optimization Methods |
Introduction
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Optimization Methods |
Minimization of functions
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Optimization Methods |
Euler equation 1
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Optimization Methods |
Euler equation 2
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Optimization Methods |
Lagrange problem for the functions family
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Optimization Methods |
Lagrange problem with high derivatives
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Optimization Methods |
Lagrange problem for functions with many variables
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Optimization Methods |
Bolza Problem
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Optimization Methods |
Variational problems with isoperimetric conditions
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Optimization Methods |
Variational problems with pointwise constraints
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Optimization Methods |
Easist optimization control problem
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Optimization Methods |
Optimization control problem for the vector case
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Optimization Methods |
Optimization control problem with fixed final state
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Optimization Methods |
Gradient methods
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Optimization Methods |
Existence and uniqueness
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Optimization Methods |
Inverse problems
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Optimization Methods |
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Optimization Methods |
practical works
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Inverse Problems of Mathematical Physics |
Inverse problems syllabus
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Sequential Models of Mathematical Physics |
Стохастические модели
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Sequential Models of Mathematical Physics |
Силлабус
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Sequential Models of Mathematical Physics |
Методические указания
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Sequential Models of Mathematical Physics |
Задания
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Sequential Models of Mathematical Physics |
Введение
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Sequential Models of Mathematical Physics |
Дискретные модели
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Sequential Models of Mathematical Physics |
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Methods of Teaching Higher Education Mathematics |
Addition
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Methods of Teaching Higher Education Mathematics |
Силлабус
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Methods of Teaching Higher Education Mathematics |
силлабу_Серовайский С.Я. Методика преподавания математики высшей школы. 6M060100 Математика.
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Methods of Teaching Higher Education Mathematics |
силлабус
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Methods of Teaching Higher Education Mathematics |
Tasks
|
|
Methods of Teaching Higher Education Mathematics |
Language
|
|
Methods of Teaching Higher Education Mathematics |
Sets theory
|
|
Methods of Teaching Higher Education Mathematics |
Numbers theory
|
|
Methods of Teaching Higher Education Mathematics |
Order
|
|
Methods of Teaching Higher Education Mathematics |
algebra
|
|
Methods of Teaching Higher Education Mathematics |
topology
|
|
Methods of Teaching Higher Education Mathematics |
measure
|
|
Methods of Teaching Higher Education Mathematics |
mixt structures
|
|
Methods of Teaching Higher Education Mathematics |
syntesis
|
|
Methods of Teaching Higher Education Mathematics |
midterm
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Mathematical Models of Nonequilibrium Filtration Processes |
|
|
Theory of stability of dynamic systems |
Bibliography
|
|
Theory of stability of dynamic systems |
Comments
|
|
Theory of stability of dynamic systems |
Dictionary
|
|
Theory of stability of dynamic systems |
Stability Theory Syllabus
|
|
Theory of stability of dynamic systems |
|
|
Theory of stability of dynamic systems |
syllabus
|
|
Theory of stability of dynamic systems |
|
|
Theory of stability of dynamic systems |
Tasks
|
|
Theory of stability of dynamic systems |
Tasks
|
|
Theory of stability of dynamic systems |
Introduction
|
|
Theory of stability of dynamic systems |
Example 1
|
|
Theory of stability of dynamic systems |
Example 2
|
|
Theory of stability of dynamic systems |
Example 4
|
|
Theory of stability of dynamic systems |
Example 5
|
|
Theory of stability of dynamic systems |
Example 6
|
|
Theory of stability of dynamic systems |
Example 7
|
|
Theory of stability of dynamic systems |
Example 8
|
|
Theory of stability of dynamic systems |
Conclusion
|
|
Theory of stability of dynamic systems |
Final control program
|
|
Differential Games |
syllabus
|
|
Differential Games |
Introduction
|
|
Differential Games |
Classic models
|
|
Differential Games |
Generalized models
|
|
Differential Games |
Convegence
|
|
Differential Games |
Completeness and real numbers
|
|
Differential Games |
Real numbers and completion
|
|
Differential Games |
Optimization
|
|
Differential Games |
Distributions
|
|
Differential Games |
Sequential
|
|
Modern Problems of the Theory of Mathematical Physics |
силлабус
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
Tasks
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
1 Classic models
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
Methodical recommendations
|
|
Modern Problems of the Theory of Mathematical Physics |
|
|
Modern Problems of the Theory of Mathematical Physics |
силлабус_Серовайский С.Я. Современные проблемы теории математической физики. 6D060100 Математика.
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Inverse Problems in Hydrodynamics |
|
|
Calculus of Variations |
|
|
Calculus of Variations |
Lagrange problem for functions with many variables
|
|
Calculus of Variations |
Задания
|
|
Calculus of Variations |
силлабус
|
|
Calculus of Variations |
Tasks
|
|
Calculus of Variations |
Applications
|
|
Calculus of Variations |
Minimization of functions
|
|
Calculus of Variations |
Euler equation
|
|
Calculus of Variations |
Euler equation
|
|
Calculus of Variations |
Lagrange problem with high derivatives
|
|
Calculus of Variations |
Bolza Problem
|
|
Calculus of Variations |
Variational problems with isoperimetric conditions
|
|
Calculus of Variations |
Variational problems with pointwise constraints
|
|
Calculus of Variations |
Easist optimization control problem
|
|
Calculus of Variations |
Optimization control problem for the vector case
|
|
Calculus of Variations |
Optimization control problem with fixed final state
|
|
Calculus of Variations |
midterm
|
|
Boundary Value Problems for Systems of Partial Differential |
Кабанихин- книга-1988
|
|
Boundary Value Problems for Systems of Partial Differential |
AHasanov_Book-Springer2017
|
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems for partial differential systems
|
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Homework
|
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Tasks
|
|
Boundary Value Problems for Systems of Partial Differential |
Introduction
|
|
Boundary Value Problems for Systems of Partial Differential |
Differentiation of functionals
|
|
Boundary Value Problems for Systems of Partial Differential |
Functional minimization
|
|
Boundary Value Problems for Systems of Partial Differential |
Variational inequalities and projection gradient method
|
|
Boundary Value Problems for Systems of Partial Differential |
|
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Homework
|
|
Variational Calculus and Optimization Technigues |
syllabus
|
|
Variational Calculus and Optimization Technigues |
Tasks
|
|
Variational Calculus and Optimization Technigues |
Tasks
|
|
Variational Calculus and Optimization Technigues |
Introduction
|
|
Variational Calculus and Optimization Technigues |
Minimization of functions
|
|
Variational Calculus and Optimization Technigues |
Euler equation 1
|
|
Variational Calculus and Optimization Technigues |
Euler equation 2
|
|
Variational Calculus and Optimization Technigues |
Lagrange problem for the functions family
|
|
Variational Calculus and Optimization Technigues |
Lagrange problem with high derivatives
|
|
Variational Calculus and Optimization Technigues |
Lagrange problem for functions with many variables
|
|
Variational Calculus and Optimization Technigues |
Bolza Problem
|
|
Variational Calculus and Optimization Technigues |
|
|
Variational Calculus and Optimization Technigues |
Variational problems with pointwise constraints
|
|
Variational Calculus and Optimization Technigues |
Easist optimization control problem
|
|
Variational Calculus and Optimization Technigues |
Optimization control problem for the vector case
|
|
Variational Calculus and Optimization Technigues |
Gradient methods
|
|
Variational Calculus and Optimization Technigues |
Stationary conditions and variational inequalities
|
|
Variational Calculus and Optimization Technigues |
Existence and uniqueness
|
|
Variation Calculus and Optimization Methods |
силлабус
|
|
Variation Calculus and Optimization Methods |
силлабус
|
|
Variation Calculus and Optimization Methods |
силлабус
|
|
Variation Calculus and Optimization Methods |
syllabus
|
|
Variation Calculus and Optimization Methods |
2024 Variation Calculus Syllabus
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
Силлабус
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
Минимизация функций
|
|
Variation Calculus and Optimization Methods |
Уравнение Эйлера
|
|
Variation Calculus and Optimization Methods |
Задача Лагранжа для вектор-функций
|
|
Variation Calculus and Optimization Methods |
Задача Больца
|
|
Variation Calculus and Optimization Methods |
Условие Лежандра
|
|
Variation Calculus and Optimization Methods |
Tasks
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
Minimization of functions
|
|
Variation Calculus and Optimization Methods |
3 Euler equation 1
|
|
Variation Calculus and Optimization Methods |
4 Euler equation 2
|
|
Variation Calculus and Optimization Methods |
5 Lagrange problem for the functions family
|
|
Variation Calculus and Optimization Methods |
6 Lagrange problem with high derivatives
|
|
Variation Calculus and Optimization Methods |
7 Lagrange problem for functions with many variables
|
|
Variation Calculus and Optimization Methods |
8 Bolza Problem
|
|
Variation Calculus and Optimization Methods |
9 Variational problems with isoperimetric conditions
|
|
Variation Calculus and Optimization Methods |
9 Variational problems with pointwise constraints
|
|
Variation Calculus and Optimization Methods |
10 Easist optimization control problem
|
|
Variation Calculus and Optimization Methods |
12 Optimization control problem with fixed final state
|
|
Variation Calculus and Optimization Methods |
Gradient methods
|
|
Variation Calculus and Optimization Methods |
14 Stationary conditions and variational inequalities
|
|
Variation Calculus and Optimization Methods |
14 Stationary conditions and variational inequalities
|
|
Variation Calculus and Optimization Methods |
15 Existence and uniqueness
|
|
Variation Calculus and Optimization Methods |
Ввведение
|
|
Variation Calculus and Optimization Methods |
Минимизация функций
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
Уравнение Эйлера для задачи Лагранжа
|
|
Variation Calculus and Optimization Methods |
Задача Лагранжа для семейства функций
|
|
Variation Calculus and Optimization Methods |
Задача Лагранжа для функций многих переменных
|
|
Variation Calculus and Optimization Methods |
Задача Больца
|
|
Variation Calculus and Optimization Methods |
Задачи на условный экстремум
|
|
Variation Calculus and Optimization Methods |
Задачи на условный экстремум 2
|
|
Variation Calculus and Optimization Methods |
Принцип максимума Понтрягина
|
|
Variation Calculus and Optimization Methods |
Принцип максимума Понтрягина 2
|
|
Variation Calculus and Optimization Methods |
Существование оптимального управления
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
midterm
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
Questions
|
|
Variation Calculus and Optimization Methods |
силлабус_Серовайский С.Я. Вариационное исчисление и методы оптимизации. 5В060100 Математика
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Variation Calculus and Optimization Methods |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Partial Differential Eguations |
|
|
Pedagogy of Mathematics |
Pedagogy of Mathematics syllabus
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
The Theory of Generalized Function |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
Рекомендации
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
Язык математики
|
|
Methods of Teaching Higher Education Mathematics |
Множества
|
|
Methods of Teaching Higher Education Mathematics |
Числа
|
|
Methods of Teaching Higher Education Mathematics |
Порядковые объекты
|
|
Methods of Teaching Higher Education Mathematics |
Алгебраические объекты
|
|
Methods of Teaching Higher Education Mathematics |
Топологические объекты
|
|
Methods of Teaching Higher Education Mathematics |
Измеримые объекты
|
|
Methods of Teaching Higher Education Mathematics |
Композиты
|
|
Methods of Teaching Higher Education Mathematics |
синтез
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Methods of Teaching Higher Education Mathematics |
|
|
Mathematical analysis on metric spaces |
|
|
Mathematical analysis on metric spaces |
|
|
Optimal control of systems with partial derivatives |
AHasanov_Book-Springer2017
|
|
Optimal control of systems with partial derivatives |
Optimization PDE
|
|
Optimal control of systems with partial derivatives |
Optimization PDE Tasks
|
|
Optimal control of systems with partial derivatives |
Optimization PDE Homework
|
|
Optimal control of systems with partial derivatives |
Introduction
|
|
Optimal control of systems with partial derivatives |
Minimization of functions
|
|
Optimal control of systems with partial derivatives |
Functional minimization
|
|
Optimal control of systems with partial derivatives |
|
|
Optimal control of systems with partial derivatives |
Optimization PDE
|
|
Optimal control of systems with partial derivatives |
Minimization of functions
|
|
Partial Differential Equations |
|
|
Partial Differential Equations |
Variation Calculus Syllabus
|
|
Partial Differential Equations |
|
|
Partial Differential Equations |
|
|
Partial Differential Equations |
|
|
Partial Differential Equations |
|
|
Partial Differential Equations |
Final control program
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Iterative methods for solving nonlinear equations and their applications |
|
|
Theoretical and computational problems of mathematical physics |
Словарь терминов
|
|
Theoretical and computational problems of mathematical physics |
Силлабус
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
Введение
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
Упорядоченные объекты
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Actual problems of mathematics |
|
|
Actual problems of mathematics |
|
|
Actual problems of mathematics |
|
|
Actual problems of mathematics |
|
|
Geometric control theory |
Программа курса (рус)
|
|
Geometric control theory |
Bibliography
|
|
Geometric control theory |
Dictionary
|
|
Geometric control theory |
Comments
|
|
Geometric control theory |
SYLLABUS
|
|
Geometric control theory |
Задания
|
|
Geometric control theory |
Tasks
|
|
Geometric control theory |
Tasks
|
|
Geometric control theory |
Минимизация функций
|
|
Geometric control theory |
Stationary condition
|
|
Geometric control theory |
Sufficiently and uniqueness
|
|
Geometric control theory |
Singular control
|
|
Geometric control theory |
Solvability
|
|
Geometric control theory |
System with fixed final state
|
|
Geometric control theory |
Tihonov well-posedness
|
|
Geometric control theory |
Hadamard well-posedness
|
|
Geometric control theory |
System with isoperimetric condition
|
|
Geometric control theory |
Bifurcation of extremals
|
|
Geometric control theory |
|
|
Geometric control theory |
SYLLABUS
|
|
Additional chapter Functional Analysis and Their Applications |
Русская версия программы
|
|
Additional chapter Functional Analysis and Their Applications |
SYLLABUS
|
|
Additional chapter Functional Analysis and Their Applications |
Tasks
|
|
Additional chapter Functional Analysis and Their Applications |
Introduction
|
|
Additional chapter Functional Analysis and Their Applications |
|
|
Additional chapter Functional Analysis and Their Applications |
|
|
Additional chapter Functional Analysis and Their Applications |
|
|
Applied analysis for Partial Differential Equations |
Введение (рус)
|
|
Applied analysis for Partial Differential Equations |
SYLLABUS
|
|
Applied analysis for Partial Differential Equations |
Tasks
|
|
Applied analysis for Partial Differential Equations |
|
|
Applied analysis for Partial Differential Equations |
|
|
Applied analysis for Partial Differential Equations |
|
|
Applied analysis for Partial Differential Equations |
Приблизительные билеты
|
|
The Qualitative and asymptotic Theory of Differential Equations |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
STEM |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
|
Theoretical and computational problems of mathematical physics |
|
1
Серовайский Семен Яковлевич
Қазақ университетi
2011 - г.
ISBN 9965-29-669-3
12 - стр.
2
Серовайский Семен Яковлевич
Оперативная полиграфия
2015 - г.
ISBN 978-601-06-3135-9
856 - стр.
3
Серовайский Семен Яковлевич
Оптимизация и дифференцирование
CRC Press Taylor &Francis Group
2017 - г.
ISBN 9781498750936 -
517 - стр.
4
Серовайский Семен Яковлевич
Секвенциальные модели математической физики
CRC Press, Taylor & Francis Group
2019 - г.
ISBN 9781138601031 -
226 - стр.
5
Серовайский Семен Яковлевич
History of mathematics. Evolution of mathematical ideas
URSS
2019 - г.
ISBN 978-5-9710-5852
226 - стр.
6
Серовайский Семен Яковлевич
История математики: Эволюция математических идей. Кн. 2. Алгебра. Анализ. Дифференциальные уравнения. Теория экстремума
URSS
2019 - г.
ISBN 978-5-9710-5863
368 - стр.
7
Серовайский Семен Яковлевич
История математики: Эволюция математических идей. Кн. 3. Вычислительная математика. Теория вероятностей. Информатика. Математическая логика.
URSS
2019 - г.
ISBN 978-5-9710-5864
240 - стр.
1
Серовайский Семен Яковлевич
Метод штрафа в сингулярных нелинейных управляемых системах с поточечными фазовыми ограничениями
2011 - г.
7 - стр.
0
2
Серовайский Семен Яковлевич
2012 - г.
6 - стр.
20
3
Серовайский Семен Яковлевич
2012 - г.
12 - стр.
0
4
Серовайский Семен Яковлевич
2012 - г.
15 - стр.
0
5
Серовайский Семен Яковлевич
2014 - г.
11 - стр.
8
6
Серовайский Семен Яковлевич
2014 - г.
13 - стр.
1
7
Серовайский Семен Яковлевич
2014 - г.
8 - стр.
1
8
Серовайский Семен Яковлевич
2014 - г.
14 - стр.
1
9
Серовайский Семен ЯковлевичШакенов К.К.
2016 - г.
258 - стр.
0
10
Серовайский Семен Яковлевич
2015 - г.
6 - стр.
97
11
Серовайский Семен Яковлевич
2015 - г.
4 - стр.
0
12
Серовайский Семен Яковлевич
2015 - г.
7 - стр.
0
13
Серовайский Семен Яковлевич
2015 - г.
21 - стр.
0
14
Серовайский Семен Яковлевич
Прогулка по линейному миру. 3.
2015 - г.
7 - стр.
55
15
Серовайский Семен Яковлевич
Прогулка по линейному миру. 4
2015 - г.
5 - стр.
56
16
Серовайский Семен Яковлевич
Математика и развитие цивилизации
2016 - г.
4 - стр.
60
17
Серовайский Семен Яковлевич
2016 - г.
10 - стр.
20
18
Серовайский Семен Яковлевич
2016 - г.
14 - стр.
0
19
Серовайский Семен Яковлевич
Задача оптимального управления для систем, описываемых эллиптическими вариационными неравенствами с фазовыми ограничениями
2016 - г.
14 - стр.
0
20
Серовайский Семен ЯковлевичКасенов С.Е.
Дискретті мәліметтер экспериментімен популяцияның шектелген өсудегі Ферхюльст теңдеуі үшін кері есеп
2016 - г.
5 - стр.
20037
21
Серовайский Семен Яковлевич
2017 - г.
8 - стр.
2
22
Серовайский Семен Яковлевич
2013 - г.
7 - стр.
7
23
Серовайский Семен Яковлевич
Две формы аппроксимации градиента для оптимизационной задачи для уравнения теплопроводности
2017 - г.
7 - стр.
7
24
Серовайский Семен Яковлевич
Идентификации математической модели популяции бактерий в присутствии антибиотика
2017 - г.
12 - стр.
0
25
Серовайский Семен ЯковлевичКасенов С.Е.
Антибиотиктердің әсерінен бактериялық популяцияларға арналған сызықты емес дифференциалды жүйелерді анықтау
2017 - г.
7 - стр.
1
26
Серовайский Семен Яковлевич
2018 - г.
9 - стр.
1
27
Серовайский Семен Яковлевич
Identification of mathematical model of bacteria population under the antibiotic influence
2018 - г.
12 - стр.
26
28
Серовайский Семен Яковлевич
Modeling of the potential of the gravitational field at the upper boundary of the region with the existence of a subterranean anomaly
2018 - г.
17 - стр.
9
29
Серовайский Семен ЯковлевичАлибаева К.А.
2020 - г.
10 - стр.
0
30
Серовайский Семен Яковлевич
2022 - г.
11 - стр.
7
1
Серовайский Семен Яковлевич
2011 - г.
5 - стр.
Crete
2
Серовайский Семен Яковлевич
2011 - г.
1 - стр.
Ankara
3
Серовайский Семен Яковлевич
2011 - г.
1 - стр.
Алматы
4
Серовайский Семен Яковлевич
2011 - г.
1 - стр.
Ташкент
5
Серовайский Семен Яковлевич
2011 - г.
1 - стр.
Калькутта
6
Серовайский Семен Яковлевич
2012 - г.
1 - стр.
Дубна
7
Серовайский Семен Яковлевич
2012 - г.
1 - стр.
Гаэта
8
Серовайский Семен Яковлевич
2012 - г.
1 - стр.
Хельсинки
9
Серовайский Семен Яковлевич
2014 - г.
1 - стр.
Issyk-Kul
10
Серовайский Семен Яковлевич
2014 - г.
3 - стр.
Алматы
11
Серовайский Семен Яковлевич
2014 - г.
1 - стр.
Алматы
12
Серовайский Семен Яковлевич
2014 - г.
2 - стр.
Атырау
13
Серовайский Семен Яковлевич
2014 - г.
1 - стр.
Новосибирск
14
Серовайский Семен Яковлевич
2014 - г.
2 - стр.
Петровац
15
Серовайский Семен Яковлевич
2014 - г.
2 - стр.
Петровац
16
Серовайский Семен Яковлевич
2015 - г.
2 - стр.
Москва
17
Серовайский Семен Яковлевич
2015 - г.
2 - стр.
Москва
18
Серовайский Семен Яковлевич
2015 - г.
1 - стр.
Алматы
19
Серовайский Семен Яковлевич
2015 - г.
2 - стр.
Макао
20
Серовайский Семен Яковлевич
2015 - г.
2 - стр.
Петровац
21
Серовайский Семен Яковлевич
2015 - г.
2 - стр.
Алматы
22
Серовайский Семен Яковлевич
2016 - г.
1 - стр.
Дубна
23
Серовайский Семен Яковлевич
2016 - г.
1 - стр.
Дубна
24
Серовайский Семен Яковлевич
2013 - г.
14 - стр.
Барселона
25
Серовайский Семен Яковлевич
2015 - г.
1 - стр.
Анкара
26
Серовайский Семен Яковлевич
Математическое моделирование снижения чувствительности к действию антибиотиков микроорганизмов, вызывающих внебольничную пневмонию
2016 - г.
4 - стр.
Минск
27
Серовайский Семен Яковлевич
Обратная задача для уравнения Ферхюльста ограниченного роста популяции с дискретными экспериментальными данными
2016 - г.
1 - стр.
Алматы
28
Серовайский Семен Яковлевич
История математики и ее преподавание в высшей школе
2002 - г.
1 - стр.
Алматы
29
Серовайский Семен Яковлевич
Касенов С.Е.
Дискретті зерттеу мәліметтерімен шектелген популяцияның өсуінің Ферхюлсьт теңдеуі үшін кері есеп
2016 - г.
1 - стр.
Almaty
30
Серовайский Семен Яковлевич
Касенов С.Е.
Identification of Nonlinear Differential Systems for Bacteria Population Under Antibiotics Influence
2015 - г.
7 - стр.
Макао
31
Серовайский Семен Яковлевич
Математика между абстракцией и реальностью: пространство, вероятность, алгоритм, информация
2017 - г.
1 - стр.
Москва
32
Серовайский Семен Яковлевич
2015 - г.
7 - стр.
Macao
33
Серовайский Семен Яковлевич
Решение обратной задачи гравиметрии методом Монте-Карло на суперкомпьютере с использованием распределённых вычислений
2019 - г.
12 - стр.
Калининград
34
Серовайский Семен Яковлевич
Монте-Карло әдісімен гравиметрияның кері есептерін шешу суперкомпьютердегі үлестірілген есептеуді пайдаланып
2019 - г.
12 - стр.
г. Калининград
Author Documents
52
Citations
86 по 61
documents
h-index
5
Discrete and Continuous Models of the COVID-19 Pandemic Propagation with a Limited Time Spent in Compartments
Turar, O., Serovajsky, S., Azimov, A., Mustafin, M.
2023
Trends in Mathematics
-1, с. 101-114
0
ЦитированийSTABILIZING THE SYSTEM IN THE PROBLEM OF EPIDEMIC SPREAD LIMITED TIME OF IMMUNIZATION
Serovajsky, S., Turar, O., Imankulov, T., Azimov, A.
2023
Advanced Mathematical Models and Applications
8, с. 176-184
0
ЦитированийMATHEMATICAL MODELING OF THE EPIDEMIC PROPAGATION WITH LIMITED TIME SPENT IN COMPARTMENTS AND VACCINATION
Serovajsky, S.Y., Turar, O., Imankulov, T.
2022
KazNU Bulletin. Mathematics, Mechanics, Computer Science Series
116, с. 84-99
1
ЦитированийNON-SMOOTH OPTIMIZATION METHODS IN THE GEOMETRIC INVERSE GRAVIMETRY PROBLEM
Serovajsky, S.Y., Sigalovsky, M., Azimov, A.
2022
Advanced Mathematical Models and Applications
7, с. 5-15
3
ЦитированийMATHEMATICAL MODEL OF THE EPIDEMIC PROPAGATION WITH LIMITED TIME SPENT IN EXPOSED AND INFECTED COMPARTMENTS
Serovajsky, S.Y., Turar, O.N.
2021
KazNU Bulletin. Mathematics, Mechanics, Computer Science Series
112, с. 162-169
2
ЦитированийIdentification of mathematical model of bacteria population under the antibiotic influence
Serovajsky, S., Nurseitov, D., Kabanikhin, S., Azimov, A., Ilin, A., Islamov, R.
2021
Journal of Inverse and Ill-Posed Problems
26, с. 565-576
2
ЦитированийA numerical study of fluid flow in the porous structure of biological scaffolds
Daulbayev, C., Mansurov, Z., Sultanov, F., Shams, M., Umirzakov, A., Serovajsky, S.
2020
Eurasian Chemico-Technological Journal
22, с. 149-156
4
ЦитированийApplication of hydrochemical simulation model to determination of optimal well pattern for mineral production with In-Situ Leaching
Shayakhmetov, N.M., Aizhulov, D.Y., Alibayeva, K.A., Serovajsky, S., Panfilov, I.
2020
Procedia Computer Science
178, с. 84-93
6
ЦитированийMathematical problems of gravimetry and its applications
Serovajsky, S.Y., Azimov, A.A., Kenzhebayeva, M.O., Nurseitov, D.B., Nurseitova, A.T., Sigalovskiy, M.A.
2019
International Journal of Mathematics and Physics
10, с. 29-35
2
ЦитированийThe problem of recovering the anomaly density from the measurement of the gravitational potential
Serovajsky, S., Nurseitov, D., Nurseitova, A., Azimov, A.
2019
Advanced Mathematical Models and Applications
4, с. 150-159
1
ЦитированийOptimization and differentiation
Serovajsky, S.
2017
Optimization and Differentiation
0, с. 1-516
3
ЦитированийTwo forms of Gradient Approximation for an Optimization Problem for the Heat Equation
Serovajsky, S., Shakenov, I.
2017
Mathematical Modelling of Natural Phenomena
12, с. 139-145
1
ЦитированийOptimization control problems for systems described by elliptic variational inequalities with state constraints
Serovajsky, S.
2016
Applied and Numerical Harmonic Analysis
0, с. 211-224
1
ЦитированийInverse problem for the Verhulst equation of limited population growth with discrete experiment data
Azimov, A., Kasenov, S., Nurseitov, D., Serovajsky, S.
2016
AIP Conference Proceedings
1759, с.
7
ЦитированийOptimal control of singular stationary systems with phase constraints and state variation
Serovajsky, S.Y.
2015
Mathematical Notes
97, с. 774-778
0
Цитирований2014
Trends in Mathematics
63, с. 335-347
1
Цитирований2014
Optimization Letters
8, с. 2041-2051
3
ЦитированийOptimal control of nonlinear evolution systems in the case where the solution is not differentiable with respect to the control
Serovaiskii, S.Y.
2013
Mathematical Notes
93, с. 593-606
0
ЦитированийDifferentiability of inverse operators
Serovajsky, S.Y.
2013
Springer Proceedings in Mathematics and Statistics
44, с. 303-320
2
ЦитированийApproximation methods in optimal control problems for nonlinear infinite-dimensional systems
Serovaiskii, S.Y.
2013
Mathematical Notes
94, с. 567-582
2
ЦитированийAn optimal control problem for a nonlinear elliptic equation with a phase constraint and state variation
Serovaiskii, S.Y.
2013
Russian Mathematics
57, с. 67-70
1
ЦитированийElements of the theory and methods of parametric regulation of national economy's evolution using discrete dynamic stochastic models
Ashimov, A.A., Ashimov, A.A., Borovskii, Y.V., Novikov, D.A., Serovaiskii, S.Y., Sultanov, B.T.
2012
Automation and Remote Control
73, с. 1156-1164
0
ЦитированийAn optimal control problem for a nonlinear hyperbolic equation with an infinite time horizon
Serovajsky, S., Shakenov, K.
2012
Progress in Mathematics
301, с. 285-300
0
ЦитированийAn optimal control problem for a nonlinear hyperbolic equation with an infinite time horizon
Serovajsky, S., Shakenov, K.
2012
Evolution Equations of Hyperbolic and Schrödinger Type: Asymptotics, Estimates and Nonlinearities
0, с. 285-300
0
ЦитированийParametrical regulation of economic growth based on one computable general equilibrium model taking into account noise effects
Ashimov, A.A., Sultanov, B.T., Borovskiy, Y.V., Serovajsky, S.Y., Borovskiy, N.Y., Ashimov, A.A., Aisakova, B.A.
2011
Proceedings of the IASTED International Conference on Applied Simulation and Modelling, ASM 2011
0, с. 227-231
0
ЦитированийThe necessary optimality conditions for a nonlinear stationary system whose state functional is not differentiable with respect to the control
Serovaiskii, S.Y.
2010
Russian Mathematics
54, с. 26-38
0
Цитирований2010
Russian Mathematics
54, с. 57-65
0
ЦитированийBifurcation of extremals in the parametric control problem for the three-sector model of economy
Ashimov, A.A., Borowski, Y.V., Nurseitov, D.B., Serovajski, S.Y., Sultanov, B.T.
2010
Proceedings of the IASTED International Conference on Automation, Control, and Information Technology - Control, Diagnostics, and Automation, ACIT-CDA 2010
0, с. 93-97
0
ЦитированийOptimal control of a singular evolution equation with a nonsmooth operator and fixed terminal state
Serovaiskii, S.Y.
2007
Differential Equations
43, с. 259-266
2
ЦитированийOptimal control in nonlinear infinite-dimensional systems with nondifferentiability of two types
Serovaiskii, S.Y.
2006
Mathematical Notes
80, с. 833-847
0
ЦитированийOptimal control for singular equation with nonsmooth nonlinearity
Serovaiskii, S.Y.
2006
Journal of Inverse and Ill-Posed Problems
14, с. 621-631
2
ЦитированийSequential differentiation and its application to the theory of nonsmooth extremum problems
Serovaiskii, S.Y.
2006
Journal of Inverse and Ill-Posed Problems
14, с. 717-734
0
ЦитированийOptimal control for singular equation with nonsmooth nonlinearity
Serovaiskii, S.Y.
2006
Journal of Inverse and Ill-Posed Problems
14, с. 621-631
0
Цитирований2005
Journal of Inverse and Ill-Posed Problems
13, с. 383-396
9
ЦитированийApproximate penalty method in optimal control problems for nonsmooth singular systems
Serovaiskii, S.Y.
2004
Mathematical Notes
76, с. 834-843
5
ЦитированийApproximate solution of optimization problems for infinite-dimensional singular systems
Serovaiskii, S.Y.
2003
Siberian Mathematical Journal
44, с. 519-528
3
ЦитированийSequential extension in the problem of control in coefficients for elliptic-type equations
Serovajsky, S.Y.
2003
Journal of Inverse and Ill-Posed Problems
11, с. 523-536
6
ЦитированийApproximate solution of singular optimization problems
Serovaiskii, S.Y.
2003
Mathematical Notes
74, с. 685-694
4
ЦитированийOptimal control of an elliptic equation with a nonsmooth nonlinearity
Serovaiskii, S.Y.
2003
Differential Equations
39, с. 1497-1502
2
ЦитированийSequential extension in the problem of control in coefficients for elliptic-type equations
Serovajsky, S.Y.
2003
Journal of Inverse and Ill-Posed Problems
11, с. 523-526
0
Цитирований1999
Mathematical Notes
65, с. 705-717
0
Цитирований1997
Differential Equations
33, с. 1121-1124
1
Цитирований1996
Siberian Mathematical Journal
37, с. 1016-1027
1
ЦитированийOptimal control of a nonlinear singular system with state constraints
Serovaiskii, S.Y.
1996
Mathematical Notes
60, с. 383-388
1
ЦитированийDifferentiation of inverse functions in spaces without norm
Serovaiskii, S.Y.
1993
Functional Analysis and Its Applications
27, с. 290-292
5
Цитирований1993
Mathematical Notes
54, с. 825-832
0
ЦитированийNecessary optimality conditions for a certain class of nonlinear singular elliptic systems
Serovaiskii, S.Y.
1992
Siberian Mathematical Journal
33, с. 359-363
0
ЦитированийNecessary and sufficient optimality conditions for a system described by a nonlinear elliptic equation
Serovaiskii, S.Y.
1991
Siberian Mathematical Journal
32, с. 468-476
0
ЦитированийMethod of Tikhonov regularization in a problem of optimal control of a nonlinear parabolic system
Serovaiskii, S.Y.
1989
Siberian Mathematical Journal
30, с. 163-165
0
Цитирований1984
Siberian Mathematical Journal
25, с. 100-105
0
ЦитированийThe method of successive approximations in a problem of the optimal control of one non-linear parabolic system
Luk'yanov, A.T., Serovaiskii, S.Y.
1984
USSR Computational Mathematics and Mathematical Physics
24, с. 23-30