Educational institution |
Квалификация |
Expiration date |
---|---|---|
КазНУ им. аль-Фараби |
Высшее |
1976 |
Name of the scientific degree |
Branch of science |
Graduation Date |
---|---|---|
Доктор |
04/08/1995 |
Name of academic title |
Date of assignment |
---|---|
Профессор |
21/06/1996 |
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 |
---|---|---|
Differential Games |
15 Existence and uniqueness |
Existence and uniqueness |
Differential Games |
13 Gradient methods |
Gradient methods |
Numerical Methods for Solving Optimal Control Problems |
Synopsis |
Synopsis |
- |
Dictionary |
Dictionary |
Generalized Functions and Their Applications |
Дополнение |
Additions |
Methods of Тeaching Higher Education Mathematics |
ЛИТЕРАТУРА |
References |
Methods of Тeaching Higher Education Mathematics |
Architecture of Mathematics Course Structure |
Course Structure |
Methods of Тeaching Higher Education Mathematics |
Словарь |
Dictionary |
Generalized Functions and Their Applications |
5 Распределения |
обобщенные функции |
Modern Problems of the Theory of Mathematical Physics |
1 Классика |
Классическое решение задач математической физики |
Modern Problems of the Theory of Mathematical Physics |
3 Сходимость |
Проблема сходимости в задачах математической физики |
Modern Problems of the Theory of Mathematical Physics |
4 Пополнение |
Принцип пополнения |
Modern Problems of the Theory of Mathematical Physics |
5 Распределения |
Теория распределений и ее приложения |
Modern Problems of the Theory of Mathematical Physics |
7 Секвенциал |
Секвенциальный метод в математической физике |
Modern Problems of the Theory of Mathematical Physics |
2 Обобщение |
Обобщенное решение задач математической физики |
Differential Games |
Пример 12 |
Example 10 |
Partial Differential Eguations |
PDE 01 Introduction |
|
Boundary Value Problems for Systems of Partial Differential |
AHasanov_Book-Springer2017 |
AHasanov_Book-Springer2017 |
Partial Differential Eguations |
PDE 03 Classification |
|
Iterative methods for solving nonlinear equations and their applications |
Tasks |
|
Theoretical and computational problems of mathematical physics |
Словарь |
Словарь терминов |
Additional chapter Functional Analysis and Their Applications |
Секвенциальное моделирование. Программа |
Русская версия программы |
Mathematical Physics Equations |
Tasks |
Tasks |
Methods of Teaching Higher Education Mathematics |
Дополнения |
Addition |
Sequential Models of Mathematical Physics |
Стохастические модели |
Стохастические модели |
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 01 Введение Презентация |
|
Geometric control theory |
Программа (рус) |
Программа курса (рус) |
Methods of Teaching Higher Education Mathematics |
Словарь |
|
Partial Differential Eguations |
PDE 02 Mathematical models |
|
Theory of stability of dynamic systems |
Dictionary |
Dictionary |
Boundary Value Problems for Systems of Partial Differential |
Кабанихин- книга-1988 |
Кабанихин- книга-1988 |
Mathematical Physics Equations |
Программа |
Программа курса |
Theory of stability of dynamic systems |
Comments |
Comments |
Theory of stability of dynamic systems |
Bibliography |
Bibliography |
Theory of stability of dynamic systems |
Stability Theory Syllabus |
Stability Theory Syllabus |
Geometric control theory |
Dictionary |
Dictionary |
Geometric control theory |
Bibliography |
Bibliography |
Geometric control theory |
Comments |
Comments |
Applied analysis for Partial Differential Equations |
0 Введение |
Введение (рус) |
Methods of Teaching Higher Education Mathematics |
ЭТАЖЫ |
|
Methods of Teaching Higher Education Mathematics |
Словари |
|
Mathematical analysis on metric spaces |
Словарь |
|
Partial Differential Equations |
Partial differential equations Syllabus |
|
Calculus of Variations |
1 Introduction |
|
Calculus of Variations |
7 Lagrange problem for functions with many variables |
Lagrange problem for functions with many variables |
The Theory of Generalized Function |
Словарь 4а |
|
Mathematical Modeling |
Математическое моделирование |
С. Серовайский. Математическое моделирование |
Optimal control of systems with partial derivatives |
AHasanov_Book-Springer2017 |
AHasanov_Book-Springer2017 |
Boundary Value Problems for Systems of Partial Differential |
Boundary problems for partial differential systems |
Boundary problems for partial differential systems |
Partial Differential Eguations |
4 Mouvement of the unbounded string equation |
|
Partial Differential Equations |
Variation Calculus Syllabus |
Variation Calculus Syllabus |
Mathematical analysis on metric spaces |
SYLLABUS 2023 |
|
Calculus of Variations |
2018 УМК вариационное исчисление АУ |
силлабус |
Mathematical Modeling |
Силлабус Математическое моделирование |
Силлабус Математическое моделирование |
Optimization Methods |
Optimization methods |
|
Partial Differential Eguations |
Уравнения в частных производных Силлабус |
|
Variation Calculus and Optimization Methods |
Variation Calculus Syllabus |
Variation Calculus Syllabus |
Methods of Teaching Higher Education Mathematics |
Силлабус 2024 |
|
Inverse Stochastic Differential Systems Problems |
Inverse problems 2019 |
syllabus |
Differential Games |
Differential games 2019 |
syllabus |
Theory of stability of dynamic systems |
Stabiliry Theory 2019 |
syllabus |
Geometric control theory |
SYLLABUS Geometric control theory |
SYLLABUS |
Applied analysis for Partial Differential Equations |
SYLLABUS Applied analysis of partial differential equations |
SYLLABUS |
Variational Calculus and Optimization Technigues |
Calculus of Variations Mech |
syllabus |
Geometric control theory |
SYLLABUS Geometric control theory |
SYLLABUS |
Variation Calculus and Optimization Methods |
Calculus of Variations Math |
syllabus |
Partial Differential Eguations |
2 Mathematical models |
|
Partial Differential Eguations |
3 Classification of second order partial differential equations |
|
Mathematical Modeling |
Mathematical modelling Syllabus |
Mathematical modelling Syllabus |
Partial Differential Eguations |
Partial differential equations Syllabus 2023 |
|
Mathematical Physics Equations |
силлабус_Серовайский С.Я. _Уравнения математической физики |
Силлабус |
Partial Differential Eguations |
5 Oscillation of the string with fixed ends |
|
Theoretical and computational problems of mathematical physics |
Силлабус |
Силлабус |
Variation Calculus and Optimization Methods |
2018 УМК вариационное исчисление АУ |
силлабус |
Variation Calculus and Optimization Methods |
2018 УМК вариационное исчисление АУ |
силлабус |
Variation Calculus and Optimization Methods |
СИЛЛАБУС Вариационное исчисление |
Силлабус |
Methods of Teaching Higher Education Mathematics |
силлабус_Серовайский С.Я. Методика преподавания математики высшей школы. 6M060100 Математика.(2) |
Силлабус |
Variation Calculus and Optimization Methods |
силлабус_Серовайский С.Я. _Вариационное исчисление и методы оптимизации. 5В060100 Математика |
силлабус |
Modern Problems of the Theory of Mathematical Physics |
силлабус_Серовайский С.Я. Современные проблемы теории математической физики. 6D060100 Математика. |
силлабус |
Additional chapter Functional Analysis and Their Applications |
Tasks |
Tasks |
Theory of stability of dynamic systems |
Stability Theory Syllabus |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Математические модели Силлабус 2023 |
|
Sequential Models of Mathematical Physics |
Силлабус Секвенциальные модели |
Силлабус |
Mathematical Models of Nonequilibrium Filtration Processes |
Математические модели Силлабус 2023 |
|
Mathematical Modeling |
Mathematical modeling Syllabus |
Mathematical modelling. Syllabus |
Mathematical Modeling |
Силлабус Математическое моделирование. |
Силлабус Математическое моделирование. |
Inverse Problems of Mathematical Physics |
Inverse problems syllabus |
Inverse problems syllabus |
Pedagogy of Mathematics |
Pedagogy of Mathematics syllabus |
Pedagogy of Mathematics syllabus |
Methods of Teaching Higher Education Mathematics |
силлабус_Серовайский С.Я. Методика преподавания математики высшей школы. 6M060100 Математика. |
силлабу_Серовайский С.Я. Методика преподавания математики высшей школы. 6M060100 Математика. |
Iterative methods for solving nonlinear equations and their applications |
Силлабус |
|
Methods of Teaching Higher Education Mathematics |
Серовайский С.Я. Методика преподавания математики высшей школы. 6M060100 Математика. |
силлабус |
Variation Calculus and Optimization Methods |
силлабус_Серовайский С.Я. _Вариационное исчисление и методы оптимизации. 5В060100 Математика |
силлабус_Серовайский С.Я. Вариационное исчисление и методы оптимизации. 5В060100 Математика |
Modern Problems of the Theory of Mathematical Physics |
силлабус_Серовайский С.Я. Современные проблемы теории математической физики. 6D060100 Математика. |
силлабус_Серовайский С.Я. Современные проблемы теории математической физики. 6D060100 Математика. |
Additional chapter Functional Analysis and Their Applications |
SYLLABUS Additional directions of functional analysis and their applications |
SYLLABUS |
The Theory of Generalized Function |
Силлабус |
|
Mathematical Physics Equations |
УМКД-силлабус eng Уравнения математической физики |
Силлабус |
Optimal control of systems with partial derivatives |
Optimization PDE |
Optimization PDE |
Mathematical Modeling |
Силлабус Математическое моделирование |
Силлабус Математическое моделирование |
Variation Calculus and Optimization Methods |
УМКД вариационное исчисление |
Силлабус |
Differential Games |
2017 УМКД дифференциальные игры |
силлабус |
Sequential Models of Mathematical Physics |
2017 УМКД секвенциальные модели |
силлабус |
Actual problems of the fundamental areas of mahtematics |
2017 УМКД актуальные проблемы |
силлабус |
Modern Problems of the Theory of Mathematical Physics |
Современные проблемы Силлабус 2023 |
|
Differential Games |
Serovajsky 2016a Differential games syllabus |
Differential games syllabus |
Modern Problems of the Theory of Mathematical Physics |
2 Обобщение |
Обобщенное решение задач математической физики |
Generalized Functions and Their Applications |
Generalized functions. Syllabus |
Generalized functions. Syllabus |
Modern Problems of the Theory of Mathematical Physics |
Mathematical physics. Syllabus |
Mathematical physics. Syllabus |
Methods of Тeaching Higher Education Mathematics |
Serovajsky 2016a Teaching method syllabus |
Teaching method syllabus |
Variation Calculus and Optimization Methods |
2015 Вариационные методы Силлабус |
Вариационные методы Силлабус |
Variation Calculus and Optimization Methods |
2013 Calculus of variations UMK |
Calculus of variations UMK |
Inverse Stochastic Differential Systems Problems |
2014 Differential games Syllabus |
Differential games Syllabus |
Inverse Stochastic Differential Systems Problems |
Inverse problems Syllabus |
Inverse problems Syllabus |
Inverse Stochastic Differential Systems Problems |
Inverse problems UMK |
Inverse problems UMK |
Variation Calculus and Optimization Methods |
2013 Calculus of variations UMK |
Calculus of variations and optimization methods. UMK |
Variation Calculus and Optimization Methods |
2013 Calculus of variations Syllabus |
Calculus of variations and optimization methods. Syllabus |
History of Mathematics |
Syllabus 2012 Differentiation and optimization |
Syllabus for the course Optimization and differentiation |
History of Mathematics |
Syllabus 2012 Sequential models of mathematical physics problems |
Syllabus for the course "Sequential models of mathematical physics problems" |
Variation Calculus and Optimization Methods |
Syllabus |
|
History of Mathematics |
Syllabus 2012 History of mathematics |
Syllabus for the course History of Mathematics |
History of Mathematics |
Syllabus 2012 Differentiation and optimization |
Syllabus for the course Sequential model of mathematical phisics problems |
Generalized Functions and Their Applications |
Generalized functions. Syllabus |
Generalized functions. Syllabus |
Variation Calculus and Optimization Methods |
Serovajsky 2016a Calculus of variations syllabus |
Calculus of variations and optimization methods. Syllabus |
Numerical Methods Control of Optimal Tasks |
Numerical methods Syllabus |
Numerical methods Syllabus |
Modern Problems of the Theory of Mathematical Physics |
2014 Mathematical physics Syllabus |
Mathematical physics Syllabus |
- |
Syllabus Direct methods of solving difference equations |
Syllabus Direct methods of solving difference equations |
Variation Calculus and Optimization Methods |
2013 Calculus of variations Syllabus |
Syllabus |
Practical Course of the Optimization Control Theory |
2013 Practical course Syllabus |
Syllabus |
Sequential Models of Mathematical Physics |
2013 Sequential models Syllabus |
Syllabus |
- |
2013 Inverse problems Syllabus |
Syllabus |
Numerical Methods Control of Optimal Tasks |
0 Introduction |
Introduction |
Numerical Methods Control of Optimal Tasks |
Example 1 |
Example 1 |
Numerical Methods Control of Optimal Tasks |
Example 2 |
Example 2 |
Numerical Methods Control of Optimal Tasks |
Example 3 |
Example 3 |
Numerical Methods Control of Optimal Tasks |
Example 4 |
Example 4 |
Numerical Methods Control of Optimal Tasks |
Example 5 |
Example 5 |
Numerical Methods Control of Optimal Tasks |
Example 6 |
Example 6 |
Numerical Methods Control of Optimal Tasks |
Example 7 |
Example 7 |
Numerical Methods Control of Optimal Tasks |
Example 8 |
Example 8 |
Variation Calculus and Optimization Methods |
2014 Calculus of variations Syllabus |
Calculus of variations Syllabus |
Inverse Stochastic Differential Systems Problems |
2014 Inverse problems UMK |
Inverse problems UMK |
Inverse Stochastic Differential Systems Problems |
2014 Inverse problems Syllabus |
Inverse problems Syllabus |
Generalized Functions and Their Applications |
2014 Generalized functions Syllabus |
Generalized functions Syllabus |
Generalized Functions and Their Applications |
2014 Generalized functions Syllabus |
Generalized functions Syllabus |
Generalized Functions and Their Applications |
UMK 2014 Generalized functions |
UMK Generalized functions |
Variation Calculus and Optimization Methods |
2014 Calculus of variations UMK |
Calculus of variations UMK |
Numerical Methods for Solving Optimal Control Problems |
2014 Numerical methods UMK |
Numerical methods for the optimization control problems UMK |
Numerical Methods for Solving Optimal Control Problems |
2014 Numerical methods Syllabus |
Numerical methods for the optimization control problems Syllabus |
Development of Algorithms for Optimal Control of Spacecraft |
2014 Development of the algorithms for the optimal control of the spacecraft UMK |
Development of the algorithms for the optimal control of the spacecraft UMK |
Development of Algorithms for Optimal Control of Spacecraft |
2014 Development of the algorithms for the optimal control of the spacecraft Syllabus |
Development of the algorithms for the optimal control of the spacecraft Syllabus |
Differential Games |
2014 Differential games Syllabus |
Differential games Syllabus |
Differential Games |
2014 Differential games UMK |
Differential games UMK |
Sequential Models of Mathematical Physics |
2014 Sequential models Syllabus |
Sequential models of mathematical physics. Syllabus |
Sequential Models of Mathematical Physics |
UMK 2014 Sequential models |
Sequential models of mathematical physics. UMK |
Sequential Models of Mathematical Physics |
1 Classic models |
Classic models of mathematical physics |
Boundary Optimal Control Problem |
2015 Boundary optimization control problems Syllabus |
Boundary optimization control problems Syllabus |
Variational Methods |
2015 Вариационные методы Силлабус |
Вариационные методы Силлабус |
Partial Differential Eguations |
PDE 03 Classification of partial differential equations Task |
|
Partial Differential Eguations |
PDE 05 String First boundary problem Task |
|
Partial Differential Eguations |
PDE 01 Differential equations Task |
|
Partial Differential Eguations |
PDE 02 First order partial differential equations Task |
|
Partial Differential Eguations |
PDE 04 Travelling waves Task |
|
Theory of stability of dynamic systems |
PDE 01 Differential equations Tasks |
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Homework |
Boundary problems Homework |
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Homework |
Boundary problems Homework |
Optimal control of systems with partial derivatives |
Optimization PDE Tasks |
Optimization PDE Tasks |
STEM |
Task 5 Competition |
|
Mathematical Modeling |
Моделирование Методические указания |
Моделирование Методические указания |
Partial Differential Equations |
PDE 01 Differential equations Tasks |
|
STEM |
Task 6 Niche model |
|
Optimal control of systems with partial derivatives |
Optimization PDE |
Optimization PDE |
Mathematical Modeling |
Mathematical modelling Tasks |
Mathematical modelling Tasks |
Calculus of Variations |
Tasks |
Задания |
Optimization Methods |
Tasks |
practical works |
Optimization Methods |
Tasks |
practical works |
Mathematical Physics Equations |
Tasks |
Task |
Applied analysis for Partial Differential Equations |
Tasks |
Tasks |
STEM |
Task 7 Economics |
|
Methods of Teaching Higher Education Mathematics |
Задания |
Рекомендации |
STEM |
Task 2 One species |
|
Variational Calculus and Optimization Technigues |
Tasks |
Tasks |
Partial Differential Eguations |
PDE 08 Heat First boundary problem Task |
|
Theory of stability of dynamic systems |
Tasks |
Tasks |
Geometric control theory |
Tasks |
Tasks |
Mathematical Physics Equations |
Tasks |
Tasks |
Partial Differential Eguations |
PDE 06 String Second boundary problem Task |
|
Partial Differential Eguations |
PDE 07 Non-homogeneous String vibrating equation Task |
|
Partial Differential Eguations |
PDE 09 Heat Second boundary problem Task |
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Tasks |
Boundary problems Tasks |
Variation Calculus and Optimization Methods |
Задание № 1 Минимизация функций |
Минимизация функций |
Modern Problems of the Theory of Mathematical Physics |
Задание |
|
Theoretical and computational problems of mathematical physics |
Задание 01 Язык |
|
Mathematical Physics Equations |
Tasks |
|
STEM |
4 Symbiosis |
|
Mathematical Physics Equations |
Tasks |
Tasks |
STEM |
Task 4 Symbiosis |
|
Geometric control theory |
ЗАДАНИЯ САМОСТОЯТЕЛЬНУЮ РАБОТУ |
Задания |
Variation Calculus and Optimization Methods |
Задание № 2 Уравнение Эйлера |
Уравнение Эйлера |
Variation Calculus and Optimization Methods |
Задание № 3 Задача Лагранжа для вектор-функций |
Задача Лагранжа для вектор-функций |
Variation Calculus and Optimization Methods |
Задание № 5 Задача Больца |
Задача Больца |
Variation Calculus and Optimization Methods |
Задание № 7 Условие Лежандра |
Условие Лежандра |
Iterative methods for solving nonlinear equations and their applications |
СРС |
|
Modern Problems of the Theory of Mathematical Physics |
Tasks |
Tasks |
Sequential Models of Mathematical Physics |
Методические указания |
Методические указания |
Mathematical Models of Nonequilibrium Filtration Processes |
Модели Задания |
|
STEM |
Task 3 Predator-prey |
|
Iterative methods for solving nonlinear equations and their applications |
ЗАДАНИЯ НА САМОСТОЯТЕЛЬНУЮ РАБОТУ |
|
Theoretical and computational problems of mathematical physics |
Задание 02 Множества |
|
Actual problems of the fundamental areas of mahtematics |
Tasks |
СРС |
Mathematical Physics Equations |
Tasks |
Tasks |
Generalized Functions and Their Applications |
Tasks |
Tasks |
History of Mathematics |
UMK 2012 History of mathematics |
Seminars for the course "Sequential model of mathematical phisics problems" |
History of Mathematics |
UMK 2012 Differentiation and optimization |
Seminars for the course Differentiation and optimization |
Inverse Stochastic Differential Systems Problems |
Tasks |
Tasks new |
Variation Calculus and Optimization Methods |
3. Differentiation of functionals |
Differentiation of functionals new |
History of Mathematics |
UMK 2012 Sequential models of mathematical physics problems |
UMK for the course "Sequential models of mathematical physics problems" |
Inverse Stochastic Differential Systems Problems |
1 Introduction |
ntroduction |
Modern Problems of the Theory of Mathematical Physics |
Tasks |
Tasks |
Numerical Methods for Solving Optimal Control Problems |
Пример 9 |
Additional example |
Numerical Methods for Solving Optimal Control Problems |
Пример 12 |
Additional example |
Differential Games |
1 Минимизация функций |
Minimization of the functions |
Differential Games |
2 Уравнение Эйлера |
Euler equation |
- |
Пример 10 |
Example 10 |
- |
Пример 11 |
Example 11 |
- |
Пример 12 |
Example 12 |
Modern Problems of the Theory of Mathematical Physics |
Задание № 1 Минимизация функций |
Minimization of the functions. Seminar |
Modern Problems of the Theory of Mathematical Physics |
Задание № 10. Градиентные методы |
Gradient methods. Seminar |
Variation Calculus and Optimization Methods |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Variation Calculus and Optimization Methods |
8 Variational problems with isoperimetric conditions |
Variational problems with isoperimetric conditions |
Variation Calculus and Optimization Methods |
8 Variational problems with isoperimetric conditions |
Variational problems with isoperimetric conditions |
Variation Calculus and Optimization Methods |
11 Optimization control problem for the vector case |
Optimization control problem for the vector case |
- |
Пример 9 |
Example 9 |
Generalized Functions and Their Applications |
5 Распределения |
Distributions |
Generalized Functions and Their Applications |
2 Обобщение |
Generalized solutions |
Development of Algorithms for Optimal Control of Spacecraft |
13 Gradient methods |
Gradient methods |
Development of Algorithms for Optimal Control of Spacecraft |
12 Optimization control problem with fixed final state |
Optimization control problem with fixed final state |
- |
Tasks |
Tasks |
Variation Calculus and Optimization Methods |
7 Bolza Problem |
Bolza Problem |
Modern Problems of the Theory of Mathematical Physics |
Задание № 2 Уравнение Эйлера |
Euler equation |
Modern Problems of the Theory of Mathematical Physics |
Задание № 11. Принцип максимума |
Miximum principle |
Numerical Methods Control of Optimal Tasks |
Tasks |
Tasks |
Development of Algorithms for Optimal Control of Spacecraft |
Tasks |
Tasks |
Development of Algorithms for Optimal Control of Spacecraft |
Tasks |
Tasks |
Numerical Methods for Solving Optimal Control Problems |
Tasks |
Tasks |
Variational Methods |
Задание № 1 Минимизация функций |
Минимизация функций |
Variational Methods |
Задание № 2 Уравнение Эйлера |
Уравнение Эйлера |
Variational Methods |
Задание № 3 Задача Лагранжа для вектор-функций |
Задача Лагранжа для вектор-функций |
Variational Methods |
Задание № 4 Задача Лагранжа со старшими производными |
Задача Лагранжа со старшими производными |
Variational Methods |
Задание № 5 Задача Больца |
Задача Больца |
Variational Methods |
Задание № 6 Вариационная задача на условный экстремум |
Вариационная задача на условный экстремум |
Variational Methods |
Задание № 7 Условие Лежандра |
Условие Лежандра |
Variational Methods |
Задание № 10. Градиентные методы |
Градиентные методы |
Variational Methods |
Задание № 11. Принцип максимума |
Принцип максимума |
Differential Games |
Задание № 1 Минимизация функций |
Минимизация функций |
Differential Games |
Задание № 2 Уравнение Эйлера |
Уравнение Эйлера |
Differential Games |
Задание № 2 Уравнение Эйлера |
Уравнение Эйлера |
Modern Problems of the Theory of Mathematical Physics |
Tasks |
|
Differential Games |
Пример 9 |
Example 9 |
Generalized Functions and Their Applications |
Tasks |
Задания |
Methods of Тeaching Higher Education Mathematics |
Tasks |
Tasks |
Methods of Тeaching Higher Education Mathematics |
Architecture of mathematics Практика |
Recomendations |
Methods of Тeaching Higher Education Mathematics |
Architecture of mathematics СРС |
Homework |
Inverse Stochastic Differential Systems Problems |
2 Minimization of functions |
Minimization of functions |
Inverse Stochastic Differential Systems Problems |
Inverse problems. Questions |
Inverse problems. Questions |
History of Mathematics |
Syllabus 2012 History of mathematics |
Syllabus for the course "History of mathematics" |
History of Mathematics |
Syllabus 2012 Sequential models of mathematical physics problems |
Individual work for the course Sequential models of mathematical physics problems |
History of Mathematics |
Syllabus 2012 Differentiation and optimization |
Individuak works for the course Differentiation and optimization |
Variation Calculus and Optimization Methods |
1 Минимизация функций |
minimization of functions |
Variation Calculus and Optimization Methods |
midterm |
midterm |
Variation Calculus and Optimization Methods |
2 Уравнение Эйлера |
Euler equation |
Actual problems of the fundamental areas of mahtematics |
Tasks |
Tasks |
Partial Differential Eguations |
PDE 13 Finite difference method Task |
|
Differential Games |
Tasks |
Tasks |
Theoretical and computational problems of mathematical physics |
Структуры |
|
STEM |
Task 3 Predator-prey |
|
Geometric control theory |
Tasks |
Tasks |
Partial Differential Eguations |
PDE 14 Inverse prablems Task |
|
Mathematical Physics Equations |
Tasks |
Tasks |
Sequential Models of Mathematical Physics |
Задания |
Задания |
Methods of Teaching Higher Education Mathematics |
Architecture of mathematics СРС |
Tasks |
Theoretical and computational problems of mathematical physics |
Категории |
|
Iterative methods for solving nonlinear equations and their applications |
ЗАДАНИЯ НА САМОСТОЯТЕЛЬНУЮ РАБОТУ 2010 |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Модели Задания |
|
Modern Problems of the Theory of Mathematical Physics |
Задание |
|
Partial Differential Eguations |
PDE 10 Heat Non-homogeneous Task |
|
Partial Differential Eguations |
PDE 11 Elliptic Variation Task |
|
Partial Differential Equations |
PDE 01 Differential equations Tasks |
|
Variation Calculus and Optimization Methods |
Tasks |
Tasks |
Theory of stability of dynamic systems |
Tasks |
Tasks |
Inverse Stochastic Differential Systems Problems |
Tasks |
|
Partial Differential Eguations |
PDE 12 Laplace equation in circle Task |
|
Variational Calculus and Optimization Technigues |
Tasks |
Tasks |
Methods of Teaching Higher Education Mathematics |
Задания |
|
Applied analysis for Partial Differential Equations |
Tasks |
|
Calculus of Variations |
Tasks |
Tasks |
Mathematical Modeling |
Mathematical modelling Homework |
Mathematical modelling Homework |
Mathematical Modeling |
Моделирование Задания |
Моделирование Задания на СРС |
Optimal control of systems with partial derivatives |
Optimization PDE Homework |
Optimization PDE Homework |
Optimization Methods |
Tasks |
homework |
Optimization Methods |
8 Bolza Problem |
Bolza Problem |
Optimization Methods |
12 Optimization control problem with fixed final state |
Optimization control problem with fixed final state |
Partial Differential Eguations |
2 Mathematical models |
|
Optimal control of systems with partial derivatives |
2 Minimization of functions |
Minimization of functions |
Optimal control of systems with partial derivatives |
4 Functional minimization. 2 Lecture |
Functional minimization |
Boundary Value Problems for Systems of Partial Differential |
5 Variational inequalities and projection gradient method |
Variational inequalities and projection gradient method |
STEM |
3 Predator-prey |
|
Boundary Value Problems for Systems of Partial Differential |
1 Introduction |
Introduction |
Theory of stability of dynamic systems |
Example 1 |
Example 1 |
Optimization Methods |
2 Minimization of functions |
Minimization of functions |
Optimization Methods |
5 Lagrange problem for the functions family |
Lagrange problem for the functions family |
Optimization Methods |
9 Variational problems with isoperimetric conditions |
Variational problems with isoperimetric conditions |
Optimization Methods |
11 Optimization control problem for the vector case |
Optimization control problem for the vector case |
Optimization Methods |
15 Existence and uniqueness |
Existence and uniqueness |
Modern Problems of the Theory of Mathematical Physics |
Arhmat5 |
|
The Theory of Generalized Function |
Arhmat4d |
|
Modern Problems of the Theory of Mathematical Physics |
Arhmat4b |
|
Modern Problems of the Theory of Mathematical Physics |
Arhmat4d |
|
Mathematical Modeling |
Моделирование 01 Введение Лекция |
Моделирование 01 Введение Лекция |
Mathematical Modeling |
Моделирование 02 Механические колебания Лекция |
Моделирование 02 Механические колебания |
Mathematical Modeling |
Моделирование 03 Электрические колебания Лекция |
Моделирование 03 Электрические колебания Лекция |
Calculus of Variations |
1 Introduction |
Applications |
Calculus of Variations |
9 Variational problems with isoperimetric conditions |
Variational problems with isoperimetric conditions |
Calculus of Variations |
2 Minimization of functions |
Minimization of functions |
Calculus of Variations |
3 Euler equation 1 |
Euler equation |
Calculus of Variations |
8 Bolza Problem |
Bolza Problem |
Calculus of Variations |
11 Optimization control problem for the vector case |
Optimization control problem for the vector case |
Calculus of Variations |
5 Lagrange problem for the functions family |
Euler equation |
Calculus of Variations |
6 Lagrange problem with high derivatives |
Lagrange problem with high derivatives |
Partial Differential Equations |
2 Mathematical models |
|
Mathematical Physics Equations |
10 Heat transfer under the heat sources |
10 Heat transfer under the heat sources |
Calculus of Variations |
9 Variational problems with pointwise constraints |
Variational problems with pointwise constraints |
Calculus of Variations |
10 Easist optimization control problem |
Easist optimization control problem |
Calculus of Variations |
12 Optimization control problem with fixed final state |
Optimization control problem with fixed final state |
Optimization Methods |
1 Introduction |
Introduction |
Optimization Methods |
3 Euler equation 1 |
Euler equation 1 |
Optimization Methods |
4 Euler equation 2 |
Euler equation 2 |
Optimization Methods |
6 Lagrange problem with high derivatives |
Lagrange problem with high derivatives |
Optimization Methods |
7 Lagrange problem for functions with many variables |
Lagrange problem for functions with many variables |
Optimization Methods |
9 Variational problems with pointwise constraints |
Variational problems with pointwise constraints |
Optimization Methods |
10 Easist optimization control problem |
Easist optimization control problem |
Optimization Methods |
13 Gradient methods |
Gradient methods |
Optimization Methods |
16 Inverse problems |
Inverse problems |
The Theory of Generalized Function |
Arhmat1 |
|
The Theory of Generalized Function |
Arhmat3 |
|
The Theory of Generalized Function |
Arhmat4a |
|
The Theory of Generalized Function |
Arhmat4b |
|
The Theory of Generalized Function |
Arhmat4c |
|
The Theory of Generalized Function |
Arhmat6 |
|
The Theory of Generalized Function |
Arhmat2 |
|
The Theory of Generalized Function |
Arhmat5 |
|
Geometric control theory |
Example 1 |
Sufficiently and uniqueness |
Geometric control theory |
Example 7 |
System with isoperimetric condition |
Geometric control theory |
Example 2 |
Singular control |
Geometric control theory |
Example 4 |
System with fixed final state |
Geometric control theory |
Example 3 |
Solvability |
Methods of Teaching Higher Education Mathematics |
Arhmat6 |
синтез |
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 08 Теплоперенос Лекция |
|
Geometric control theory |
Example 6 |
Hadamard well-posedness |
Geometric control theory |
Example 5 |
Tihonov well-posedness |
Geometric control theory |
Example 8 |
Bifurcation of extremals |
Modern Problems of the Theory of Mathematical Physics |
Arhmat2 |
|
Variation Calculus and Optimization Methods |
2 Минимизация функций |
Минимизация функций |
STEM |
2 Evolution of a biological species |
|
Boundary Value Problems for Systems of Partial Differential |
3. Differentiation of functionals |
Differentiation of functionals |
Methods of Teaching Higher Education Mathematics |
Arhmat1 |
Язык математики |
Methods of Teaching Higher Education Mathematics |
Arhmat4c |
Топологические объекты |
Methods of Teaching Higher Education Mathematics |
Arhmat4d |
Измеримые объекты |
Methods of Teaching Higher Education Mathematics |
Arhmat5 |
Композиты |
Methods of Teaching Higher Education Mathematics |
Arhmat4a |
Порядковые объекты |
Methods of Teaching Higher Education Mathematics |
Arhmat4b |
Алгебраические объекты |
Variational Calculus and Optimization Technigues |
11 Optimization control problem for the vector case |
Optimization control problem for the vector case |
Differential Games |
3 Convegence |
Convegence |
Differential Games |
9 Sequential |
Sequential |
Theory of stability of dynamic systems |
Example 5 |
Example 5 |
Theory of stability of dynamic systems |
Example 8 |
Example 8 |
Theory of stability of dynamic systems |
Example 2 |
Example 2 |
Variational Calculus and Optimization Technigues |
1 Introduction |
Introduction |
Variational Calculus and Optimization Technigues |
5 Lagrange problem for the functions family |
Lagrange problem for the functions family |
Variational Calculus and Optimization Technigues |
9 Variational problems with isoperimetric conditions |
|
Variational Calculus and Optimization Technigues |
9 Variational problems with pointwise constraints |
Variational problems with pointwise constraints |
Variational Calculus and Optimization Technigues |
15 Existence and uniqueness |
Existence and uniqueness |
Inverse Stochastic Differential Systems Problems |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Partial Differential Eguations |
8 Heat transfer with known temperature at the boundary |
|
Partial Differential Eguations |
11 Laplace equation Introduction |
|
Variation Calculus and Optimization Methods |
1 Введение |
Ввведение |
Variational Calculus and Optimization Technigues |
3 Euler equation 1 |
Euler equation 1 |
Variational Calculus and Optimization Technigues |
4 Euler equation 2 |
Euler equation 2 |
Variational Calculus and Optimization Technigues |
7 Lagrange problem for functions with many variables |
Lagrange problem for functions with many variables |
Variational Calculus and Optimization Technigues |
10 Easist optimization control problem |
Easist optimization control problem |
Variational Calculus and Optimization Technigues |
13 Gradient methods |
Gradient methods |
Variational Calculus and Optimization Technigues |
14 Stationary conditions and variational inequalities |
Stationary conditions and variational inequalities |
Inverse Stochastic Differential Systems Problems |
1 Introduction |
Introduction |
Inverse Stochastic Differential Systems Problems |
7. Well-posedness of the problems |
Well-posedness of the problems |
Differential Games |
1 Classic models |
Classic models |
Differential Games |
2 Generalized models |
Generalized models |
Differential Games |
4 Completeness and real numbers |
Completeness and real numbers |
Differential Games |
8 Distributions |
Distributions |
Partial Differential Eguations |
3 Classification of second order partial differential equations |
|
Partial Differential Eguations |
9 Heat transfer for the isolated body |
|
Partial Differential Eguations |
6 Oscillation of the string equation with free ends |
|
Partial Differential Eguations |
4 Mouvement of the unbounded string equation |
|
Partial Differential Eguations |
15 Inverse problems |
|
Differential Games |
0 Introduction |
Introduction |
Differential Games |
5 Real numbers and completion |
Real numbers and completion |
Theory of stability of dynamic systems |
Introduction |
Introduction |
Theory of stability of dynamic systems |
Conclusion |
Conclusion |
Variational Calculus and Optimization Technigues |
2 Minimization of functions |
Minimization of functions |
Variational Calculus and Optimization Technigues |
6 Lagrange problem with high derivatives |
Lagrange problem with high derivatives |
Variational Calculus and Optimization Technigues |
8 Bolza Problem |
Bolza Problem |
Theory of stability of dynamic systems |
Example 4 |
Example 4 |
Theory of stability of dynamic systems |
Example 6 |
Example 6 |
Mathematical Physics Equations |
9 Heat transfer for the boundary isolated body |
Heat transfer for the boundary isolated body |
Partial Differential Eguations |
10 Heat transfer under the heat sources |
|
Variation Calculus and Optimization Methods |
3 Euler equation 1 |
3 Euler equation 1 |
Variation Calculus and Optimization Methods |
4 Euler equation 2 |
4 Euler equation 2 |
Theory of stability of dynamic systems |
Example 7 |
Example 7 |
Differential Games |
7 Optimization |
Optimization |
Partial Differential Eguations |
1 Differential equations |
|
Geometric control theory |
1 Теорема Ферма |
Stationary condition |
Partial Differential Equations |
1 Differential equations |
|
Mathematical Physics Equations |
1 Introduction |
Introduction |
Theoretical and computational problems of mathematical physics |
Числа |
|
Optimal control of systems with partial derivatives |
1 Introduction |
Introduction |
Modern Problems of the Theory of Mathematical Physics |
Arhmat3 |
|
Partial Differential Eguations |
12 Electrostatic field equation in a circle |
|
Theoretical and computational problems of mathematical physics |
Алгебраические объекты |
|
Theoretical and computational problems of mathematical physics |
Arhmat4a |
Упорядоченные объекты |
Mathematical Physics Equations |
5 Oscillation of the string with fixed ends |
Oscillation of the string with fixed ends |
Mathematical Physics Equations |
8 Heat transfer with known temperature at the boundary |
Heat transfer with known temperature at the boundary |
Theoretical and computational problems of mathematical physics |
Топологические объекты |
|
Variation Calculus and Optimization Methods |
9 Variational problems with pointwise constraints |
9 Variational problems with pointwise constraints |
STEM |
4 Symbiosis |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 02 Механические колебания Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 03 Электрические колебания Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 07 Общество Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 09 Процессы переноса Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 13 Дискретные модели Лекция |
|
STEM |
5 Competition |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 06 Экономика Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 11 Стационарные системы Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 14 Стохастические модели |
|
Partial Differential Eguations |
6 Oscillation of the string equation with free ends |
|
STEM |
7 Economics |
|
Partial Differential Eguations |
6 Oscillation of the string equation with free ends |
|
Mathematical Physics Equations |
7 Forced oscillation of the string |
Forced oscillation of the string |
Geometric control theory |
1 Минимизация функций |
Минимизация функций |
Mathematical Physics Equations |
6 Oscillation of the string equation with free ends |
Oscillation of the string equation with free ends |
Mathematical Physics Equations |
15 Inverse problems of mathematical physics |
Inverse problems of mathematical physics |
Theoretical and computational problems of mathematical physics |
Измеримые объекты |
|
Theoretical and computational problems of mathematical physics |
Композиты |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 8 |
|
Theoretical and computational problems of mathematical physics |
Введение |
Введение |
Iterative methods for solving nonlinear equations and their applications |
Пример 1 |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 3 |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 5 |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 6 |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 7 |
|
STEM |
6 Niche |
|
Mathematical Physics Equations |
4 Cauchy problem for the vibrating string equation |
Cauchy problem for the vibrating string equation |
Iterative methods for solving nonlinear equations and their applications |
Введение |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 2 |
|
Iterative methods for solving nonlinear equations and their applications |
Пример 4 |
|
Variation Calculus and Optimization Methods |
5 Lagrange problem for the functions family |
5 Lagrange problem for the functions family |
Variation Calculus and Optimization Methods |
6 Lagrange problem with high derivatives |
6 Lagrange problem with high derivatives |
Variation Calculus and Optimization Methods |
13 Gradient methods |
Gradient methods |
Variation Calculus and Optimization Methods |
14 Stationary conditions and variational inequalities |
14 Stationary conditions and variational inequalities |
Methods of Teaching Higher Education Mathematics |
Arhmat2 |
Sets theory |
Methods of Teaching Higher Education Mathematics |
Arhmat4b |
algebra |
Methods of Teaching Higher Education Mathematics |
Arhmat4c |
topology |
Methods of Teaching Higher Education Mathematics |
Arhmat4d |
measure |
Methods of Teaching Higher Education Mathematics |
Arhmat4е |
mixt structures |
Methods of Teaching Higher Education Mathematics |
Arhmat5 |
syntesis |
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 05 Биология Лекция |
|
Modern Problems of the Theory of Mathematical Physics |
Arhmat1 |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 12 Вариационные принципы Лекция |
|
Modern Problems of the Theory of Mathematical Physics |
Arhmat6 |
|
Sequential Models of Mathematical Physics |
Введение |
Введение |
Sequential Models of Mathematical Physics |
Дискретные модели |
Дискретные модели |
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 01 Введение Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 04 Химия Лекция |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Моделирование 10 Волновые процессы Лекция |
|
Methods of Teaching Higher Education Mathematics |
Arhmat3 |
Numbers theory |
Methods of Teaching Higher Education Mathematics |
Arhmat4a |
Order |
Modern Problems of the Theory of Mathematical Physics |
1 Classic models |
1 Classic models |
Methods of Teaching Higher Education Mathematics |
Arhmat1 |
Language |
Variation Calculus and Optimization Methods |
2 Minimization of functions |
Minimization of functions |
Additional chapter Functional Analysis and Their Applications |
0 Introduction |
Introduction |
Additional chapter Functional Analysis and Their Applications |
1 Classic models |
|
Variation Calculus and Optimization Methods |
7 Lagrange problem for functions with many variables |
7 Lagrange problem for functions with many variables |
Variation Calculus and Optimization Methods |
8 Bolza Problem |
8 Bolza Problem |
Variation Calculus and Optimization Methods |
9 Variational problems with isoperimetric conditions |
9 Variational problems with isoperimetric conditions |
Variation Calculus and Optimization Methods |
10 Easist optimization control problem |
10 Easist optimization control problem |
Variation Calculus and Optimization Methods |
12 Optimization control problem with fixed final state |
12 Optimization control problem with fixed final state |
Variation Calculus and Optimization Methods |
14 Stationary conditions and variational inequalities |
14 Stationary conditions and variational inequalities |
Variation Calculus and Optimization Methods |
15 Existence and uniqueness |
15 Existence and uniqueness |
Methods of Teaching Higher Education Mathematics |
Arhmat2 |
Множества |
Mathematical Physics Equations |
13 Green functions method for the Laplace and Poisson equations |
Green functions method for the Laplace and Poisson equations |
Boundary Value Problems for Systems of Partial Differential |
4 Functional minimization. 2 Lecture |
Functional minimization |
Mathematical Physics Equations |
14 Finite difference method for mathematical physics problems |
Finite difference method for mathematical physics problems |
Theoretical and computational problems of mathematical physics |
Множества |
|
Theoretical and computational problems of mathematical physics |
Структуры и категории |
|
Modern Problems of the Theory of Mathematical Physics |
Arhmat4c |
|
Partial Differential Eguations |
13 Green functions method for the Laplace and Poisson equations |
|
Mathematical Physics Equations |
3 Classification of second order partial differential equations |
Classification of second order partial differential equations |
Modern Problems of the Theory of Mathematical Physics |
Arhmat4a |
|
Differential Games |
Introduction |
Introduction |
Differential Games |
Example 1 |
Example 1 |
Differential Games |
Example 2 |
Example 2 |
Differential Games |
Example 3 |
Example 3 |
Differential Games |
Example 4 |
Example 4 |
Differential Games |
Example 5 |
Example 5 |
Differential Games |
Example 6 |
Example 6 |
Differential Games |
Example 6 |
Example 6 |
Differential Games |
Example 7 |
Example 7 |
Differential Games |
Example 8 |
Example 8 |
Actual problems of the fundamental areas of mahtematics |
1 Introduction |
Introduction |
Actual problems of the fundamental areas of mahtematics |
2 Minimization of functions |
Minimization of functions |
Actual problems of the fundamental areas of mahtematics |
3. Differentiation of functionals |
Differentiation of functionals |
Actual problems of the fundamental areas of mahtematics |
4. Minimization of functionals |
Minimization of functionals |
Actual problems of the fundamental areas of mahtematics |
5 Stationary conditions and variational inequalities |
Stationary conditions and variational inequalities |
Actual problems of the fundamental areas of mahtematics |
5. Abstract optimization control |
Abstract optimization control |
Actual problems of the fundamental areas of mahtematics |
6. Ordinary differential equations |
Ordinary differential equations |
Actual problems of the fundamental areas of mahtematics |
6. Stationary inverse problem |
Stationary inverse problem |
Actual problems of the fundamental areas of mahtematics |
6. Stationary inverse problem |
Stationary inverse problem |
Actual problems of the fundamental areas of mahtematics |
6. Stationary inverse problem |
Stationary inverse problem |
Actual problems of the fundamental areas of mahtematics |
7. Well-posedness of the problems |
Well-posedness of the problems |
Actual problems of the fundamental areas of mahtematics |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Methods of Teaching Higher Education Mathematics |
Arhmat3 |
Числа |
Mathematical Physics Equations |
12 Electrostatic field equation in a circle |
Electrostatic field equation in a circle |
Partial Differential Eguations |
14 Finite difference method for mathematical physics problems |
|
The Implementation of a Doctoral Thesis |
модель |
модель |
Mathematical Physics Equations |
2 Mathematical models |
2 Mathematical models |
- |
2 Minimization of functions |
Minimization of functions |
- |
3. Differentiation of functionals |
Differentiation of functionals |
- |
4. Minimization of functionals |
Minimization of functionals |
- |
5. Abstract optimization control |
Abstract optimization control |
- |
6. Stationary inverse problem |
Stationary inverse problem |
- |
7. Well-posedness of the problems |
Well-posedness of the problems |
- |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Inverse Stochastic Differential Systems Problems |
5. Abstract optimization control |
Abstract optimization control |
Inverse Stochastic Differential Systems Problems |
7. Well-posedness of the problems |
Well-posedness of the problems |
- |
1 Introduction |
Introduction |
Methods of Тeaching Higher Education Mathematics |
Introduction |
Introduction |
Methods of Тeaching Higher Education Mathematics |
1. Language |
Language |
Methods of Тeaching Higher Education Mathematics |
3. Numbers |
Numbers |
Methods of Тeaching Higher Education Mathematics |
4a. Ordered sets. |
Ordered sets. |
Methods of Тeaching Higher Education Mathematics |
4b. Algebraic objects |
Algebraic objects |
Methods of Тeaching Higher Education Mathematics |
4c. Topological objects |
Topological objects |
Methods of Тeaching Higher Education Mathematics |
4c. Topological objects |
Topological objects |
Methods of Тeaching Higher Education Mathematics |
4d. Measerable objects |
Measerable objects |
Methods of Тeaching Higher Education Mathematics |
5 Synthesis |
Synthesis |
Methods of Тeaching Higher Education Mathematics |
4е Mixed objects |
Mixed objects |
Modern Problems of the Theory of Mathematical Physics |
1 Classic models |
Classical solutions of the mathematical physics problems |
Modern Problems of the Theory of Mathematical Physics |
2 Generalized models |
Generalized solutions of the mathematical physics problems |
Modern Problems of the Theory of Mathematical Physics |
3 Convegence |
Convegence of methods of the analysis |
Modern Problems of the Theory of Mathematical Physics |
4 Completion |
The problem of the comoletions |
Modern Problems of the Theory of Mathematical Physics |
5 Distributions |
The distibutions theory |
Modern Problems of the Theory of Mathematical Physics |
6 Оптимум |
The applications to the optimization theory |
Modern Problems of the Theory of Mathematical Physics |
7 Секвенциал |
sequaential form of mathematical physics problems |
Differential Games |
3. Differentiation of functionals |
Differentiation of functionals |
Differential Games |
5. Abstract optimization control |
Abstract optimization control |
Differential Games |
4. Minimization of functionals |
Minimization of functionals |
Differential Games |
6. Stationary inverse problem |
Stationary inverse problem |
Differential Games |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Differential Games |
7. Well-posedness of the problems |
Well-posedness of the problems |
Variational Methods |
1 Введение |
Введение |
Variational Methods |
2 Минимизация функций |
Минимизация функций |
Variational Methods |
3 Уравнение Эйлера для задачи Лагранжа |
Уравнение Эйлера для задачи Лагранжа |
Variational Methods |
4 Задача Лагранжа для семейства функций |
Задача Лагранжа для семейства функций |
Variational Methods |
5 Задача Лагранжа при наличии старших производных |
Задача Лагранжа при наличии старших производных |
Variational Methods |
6 Задача Лагранжа для функций многих переменных |
Задача Лагранжа для функций многих переменных |
Variational Methods |
7 Задача Больца. Условие трансверсальности |
Задача Больца. Условие трансверсальности |
Variational Methods |
8 Задачи на условный экстремум |
Задачи на условный экстремум |
Variational Methods |
9 Задачи на условный экстремум 2 |
Задачи на условный экстремум 2 |
Variational Methods |
10 Условие Лежандра |
Условие Лежандра |
Variational Methods |
11 Градиентные методы |
Градиентные методы |
Variational Methods |
15 Принцип максимума Понтрягина |
Принцип максимума Понтрягина |
Variational Methods |
16 Принцип максимума Понтрягина 2 |
Принцип максимума Понтрягина 2 |
Generalized Functions and Their Applications |
1 Classic models |
Classic models and classic functions |
Generalized Functions and Their Applications |
2 Generalized models |
Generalized models and generalised functions |
Generalized Functions and Their Applications |
3 Convegence |
Convegence |
Generalized Functions and Their Applications |
4 Completion |
Completion |
Generalized Functions and Their Applications |
5 Distributions |
Distributions |
Generalized Functions and Their Applications |
6 Оптимум |
Generalised functions and optimization |
Generalized Functions and Their Applications |
7 Секвенциал |
Sequential distributions |
Generalized Functions and Their Applications |
9 Комментарии |
Conclusions |
Generalized Functions and Their Applications |
9 Комментарии |
Conclusions |
Development of Algorithms for Optimal Control of Spacecraft |
1 Introduction |
Introduction |
Development of Algorithms for Optimal Control of Spacecraft |
2 Minimization of functions |
Minimization of functions |
Development of Algorithms for Optimal Control of Spacecraft |
3. Differentiation of functionals |
Differentiation of functionals |
Development of Algorithms for Optimal Control of Spacecraft |
4. Minimization of functionals |
Minimization of functionals |
Development of Algorithms for Optimal Control of Spacecraft |
5. Abstract optimization control |
Abstract optimization control |
Development of Algorithms for Optimal Control of Spacecraft |
6. Ordinary differential equations |
Ordinary differential equations |
Development of Algorithms for Optimal Control of Spacecraft |
6. Stationary inverse problem |
Stationary inverse problem |
Development of Algorithms for Optimal Control of Spacecraft |
7. Well-posedness of the problems |
Well-posedness of the problems |
Development of Algorithms for Optimal Control of Spacecraft |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Numerical Methods for Solving Optimal Control Problems |
Introduction |
Introduction |
Numerical Methods for Solving Optimal Control Problems |
Example 1 |
Optimization and sufficiently |
Numerical Methods for Solving Optimal Control Problems |
Example 2 |
Singular control |
Numerical Methods for Solving Optimal Control Problems |
Example 3 |
Solvability of the optimazation problem |
Numerical Methods for Solving Optimal Control Problems |
Example 4 |
Existence of the optimal control |
Numerical Methods for Solving Optimal Control Problems |
Example 5 |
Tihinov's well-posedness |
Numerical Methods for Solving Optimal Control Problems |
Example 6 |
Hadamard's well-posedness |
Numerical Methods for Solving Optimal Control Problems |
Example 8 |
Extremal bifurcation |
Numerical Methods for Solving Optimal Control Problems |
Example 7 |
Isoperimetric condition |
Numerical Methods Control of Optimal Tasks |
0 Introduction |
Introduction |
Numerical Methods Control of Optimal Tasks |
Example 1 |
Example 1 |
Numerical Methods Control of Optimal Tasks |
Example 2 |
Example 2 |
Numerical Methods Control of Optimal Tasks |
Example 3 |
Example 3 |
Numerical Methods Control of Optimal Tasks |
Example 4 |
Example 4 |
Numerical Methods Control of Optimal Tasks |
Example 6 |
Example 6 |
Numerical Methods Control of Optimal Tasks |
Example 6 |
Example 6 |
Numerical Methods Control of Optimal Tasks |
Example 7 |
Example 7 |
Numerical Methods Control of Optimal Tasks |
Example 8 |
Example 8 |
- |
0 Introduction |
Introduction |
- |
Example 1 |
Example 1 |
- |
Example 2 |
|
- |
Example 3 |
Example 3 |
- |
Example 5 |
Example 5 |
- |
Example 4 |
Example 4 |
- |
Example 6 |
Example 6 |
- |
Example 7 |
Example 7 |
- |
Example 8 |
Example 8 |
Variation Calculus and Optimization Methods |
3 Euler equation |
Euler equation |
Variation Calculus and Optimization Methods |
15 Existence and uniqueness |
Existence and uniqueness |
Variation Calculus and Optimization Methods |
13 Gradient methods |
Gradient methods |
Modern Problems of the Theory of Mathematical Physics |
1 Introduction |
Introduction |
Modern Problems of the Theory of Mathematical Physics |
2 Minimization of functions |
Minimization of functions |
Modern Problems of the Theory of Mathematical Physics |
3. Differentiation of functionals |
Differentiation of functionals |
Modern Problems of the Theory of Mathematical Physics |
5. Abstract optimization control |
Abstract optimization control |
Modern Problems of the Theory of Mathematical Physics |
6. Ordinary differential equations |
Inverse problems for ordinary differential equations |
Modern Problems of the Theory of Mathematical Physics |
6. Stationary inverse problem |
Stationary inverse problems |
Modern Problems of the Theory of Mathematical Physics |
4. Minimization of functionals |
Minimization of functionals |
Modern Problems of the Theory of Mathematical Physics |
7. Well-posedness of the problems |
Minimization of functionals |
Modern Problems of the Theory of Mathematical Physics |
8. Inverse problems for parabolic equations |
Inverse problems for parabolic equations |
Numerical Methods Control of Optimal Tasks |
Numerical methods Tickets |
Tickets |
Variational Methods |
midterm |
midterm |
Differential Games |
Midterm questions |
Midterm questions |
Modern Problems of the Theory of Mathematical Physics |
Midterm questions |
Midterm questions |
Variation Calculus and Optimization Methods |
midterm |
midterm |
Differential Games |
Midtern |
Midtern |
Methods of Тeaching Higher Education Mathematics |
Midtern |
Midtern |
Variation Calculus and Optimization Methods |
Вариационные методы midterm |
midterm |
Inverse Stochastic Differential Systems Problems |
Midterm |
Midterm |
Numerical Methods Control of Optimal Tasks |
Midtern |
Midtern |
Variation Calculus and Optimization Methods |
Вопросы для экзамена |
Questions for examination |
Modern Problems of the Theory of Mathematical Physics |
Generalized functions |
Methodical recommendations |
Methods of Teaching Higher Education Mathematics |
Midterm |
midterm |
Variation Calculus and Optimization Methods |
midterm |
midterm |
Mathematical Physics Equations |
Midterm |
Midterm |
Calculus of Variations |
midterm |
midterm |
Methods of Teaching Higher Education Mathematics |
литература |
|
Mathematical Physics Equations |
Серовайский С.Я._карта обесп_EqMathPhys_math_2019 |
Серовайский С.Я._карта обесп_EqMathPhys_math_2019 |
Variation Calculus and Optimization Methods |
Serovajsky 2016a Calculus of variations syllabus |
УМК |
Modern Problems of the Theory of Mathematical Physics |
2014Mathematical physics UMK |
|
Numerical Methods Control of Optimal Tasks |
Bibliography |
Bibliography |
- |
Bibliography |
References |
Variational Methods |
2015 Вариационные методы УМК |
Вариационные методы УМК |
Variation Calculus and Optimization Methods |
Final control program VC-OM |
Final control program |
Partial Differential Equations |
Final control program PDE |
Final control program |
Optimal control of systems with partial derivatives |
2 Minimization of functions |
Minimization of functions |
Theoretical and computational problems of mathematical physics |
Теоретические основы Программа |
|
Mathematical Modeling |
Моделирование Программа |
|
Sequential Models of Mathematical Physics |
Секвенциальные модели Программа |
|
Mathematical Modeling |
Mathematical modelling Program |
|
Boundary Value Problems for Systems of Partial Differential |
Boundary problems Program |
|
Iterative methods for solving nonlinear equations and their applications |
Итерационные методы Программа |
|
Additional chapter Functional Analysis and Their Applications |
2022 Exam program |
|
STEM |
Program |
|
Methods of Teaching Higher Education Mathematics |
bagdarlamasy 2024_kz |
|
Theory of stability of dynamic systems |
Final control program ST |
Final control program |
STEM |
Program 2024 |
|
STEM |
Program 2 |
|
Variation Calculus and Optimization Methods |
2022 Вариационное исчисление Программа |
|
Applied analysis for Partial Differential Equations |
2022 Exam program |
|
Applied analysis for Partial Differential Equations |
2022 Applied analysis for Partial Differential Equation Exam program |
|
STEM |
Program 2024 |
|
Partial Differential Eguations |
Программа |
|
Mathematical Models of Nonequilibrium Filtration Processes |
Вопросы к экзамену 2 |
|
Modern Problems of the Theory of Mathematical Physics |
2021 Программа экзамена |
|
Variation Calculus and Optimization Methods |
2022 Вариационное исчисление Программа |
|
Geometric control theory |
2022 Geometric control theory Exam program |
|
Additional chapter Functional Analysis and Their Applications |
2022 Additional directions of functional analysis Exam program |
|
The Qualitative and asymptotic Theory of Differential Equations |
2022 Qualitative and asymptotic Theory of Differential Equations |
|
Variation Calculus and Optimization Methods |
questions |
Questions |
Optimal control of systems with partial derivatives |
Optimization PDS Program |
|
Methods of Teaching Higher Education Mathematics |
Программа экзамена |
|
Applied analysis for Partial Differential Equations |
Приблизительные билеты |
Приблизительные билеты |
Optimization Methods |
questions 2019 |
|
The Theory of Generalized Function |
Program |
|
The Theory of Generalized Function |
Вопросы для экзамена |
|
Methods of Teaching Higher Education Mathematics |
Программа 2024 |
|
Variational Methods |
1 Минимизация функций |
Минимизация функций |
Variational Methods |
2 Уравнение Эйлера |
Уравнение Эйлера |
Variation Calculus and Optimization Methods |
1 Introduction |
|
Қазақ университетi 2011 - г. ISBN 9965-29-669-3 12 - стр.
Оперативная полиграфия 2015 - г. ISBN 978-601-06-3135-9 856 - стр.
Оптимизация и дифференцирование
CRC Press Taylor &Francis Group 2017 - г. ISBN 9781498750936 - 517 - стр.
Секвенциальные модели математической физики
CRC Press, Taylor & Francis Group 2019 - г. ISBN 9781138601031 - 226 - стр.
History of mathematics. Evolution of mathematical ideas
URSS 2019 - г. ISBN 978-5-9710-5852 226 - стр.
История математики: Эволюция математических идей. Кн. 2. Алгебра. Анализ. Дифференциальные уравнения. Теория экстремума
URSS 2019 - г. ISBN 978-5-9710-5863 368 - стр.
История математики: Эволюция математических идей. Кн. 3. Вычислительная математика. Теория вероятностей. Информатика. Математическая логика.
URSS 2019 - г. ISBN 978-5-9710-5864 240 - стр.
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