Valery Afanasiev
- Research Professor: HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) / School of Applied Mathematics
- Tenured Professor (2018)
- Valery Afanasiev has been at HSE University since 2012.
Education, Degrees and Academic Titles
RAS Trapeznikov Institute of Control Sciences
Moscow Institute of Electronic Engineering
Moscow Power Engineering Institute
According to the International Standard Classification of Education (ISCED) 2011, Candidate of Sciences belongs to ISCED level 8 - "doctoral or equivalent", together with PhD, DPhil, D.Lit, D.Sc, LL.D, Doctorate or similar. Candidate of Sciences allows its holders to reach the level of the Associate Professor.
A post-doctoral degree called Doctor of Sciences is given to reflect second advanced research qualifications or higher doctorates in ISCED 2011.
Awards and Accomplishments
Best Teacher — 2015
Courses (2024/2025)
- Modern Control Theory Methods (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1 year, 3, 4 module)Rus
- Modern Control Theory Methods (Mago-Lego; 3, 4 module)Rus
- Operations Analysis, System Control and Information Processing (Postgraduate course; 1 year, 1 semester)Rus
- Past Courses
Courses (2023/2024)
- Modern Control Theory Methods (Mago-Lego; 3, 4 module)Rus
- Modern Control Theory Methods (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) field of study Applied Mathematics and Informatics, field of study Applied Mathematics and Informatics; 1 year, 3, 4 module)Rus
- Operations Analysis, System Control and Information Processing (Postgraduate course; 1 year, 1 semester)Rus
Courses (2022/2023)
- Modern Control Theory Methods (Mago-Lego; 3, 4 module)Rus
- Modern Control Theory Methods (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) field of study Applied Mathematics and Informatics, field of study Applied Mathematics and Informatics; 1 year, 3, 4 module)Rus
- Operations Analysis, System Control and Information Processing (Postgraduate course; 1 year, 1 semester)Rus
Courses (2021/2022)
- Control and information processing systems (mentor seminar) (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) field of study Applied Mathematics and Informatics, field of study Applied Mathematics and Informatics, field of study Applied Mathematics and Informatics, field of study Applied Mathematics, field of study Applied Mathematics, field of study Applied Mathematics; 1 year, 1-4 module)Rus
- Modern Control Theory Methods (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 2 year, 1, 2 module)Rus
- Modern Control Theory Methods (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) field of study Applied Mathematics and Informatics, field of study Applied Mathematics and Informatics, field of study Applied Mathematics and Informatics, field of study Applied Mathematics, field of study Applied Mathematics, field of study Applied Mathematics; 1 year, 1-4 module)Rus
Courses (2020/2021)
- Foundations of systems theory and control systems (Minor; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1, 2 module)Rus
- Modern Control Theory Methods (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1 year, 1-4 module)Rus
- Operations Analysis, System Control and Information Processing (Postgraduate course; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 2 year, 1 semester)Rus
- Operations Analysis, System Control and Information Processing (Postgraduate course; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) field of study Control Systems, field of study Information Security; 1 year, 1 semester)Rus
- Research Seminar (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 2 year, 1-3 module)Rus
- Research Seminar (Bachelor’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 4 year, 2, 3 module)Rus
- Research Seminar (Master’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1 year, 1-4 module)Rus
Supervisor of the following Doctoral theses
- 1A. Semion Control of Aircraft under Conditions of Limited Disturbance and Incomplete Information, 2022
- 2A. Presnova Method of synthesis of suboptimal controls for uncertain nonlinear dynamic systems, 2020
- 3I. Garazha Development of control methods for nonlinear indefinite dynamic objects (Differential games in problems of constructing a guaranteeing control of nonlinear dynamic objects)
Editorial board membership
Automation. Modern Technologies
Conferences
- 2016
8-th IFAC Conference on Manufacturing Modelling, Management and Control (Troyes). Presentation: Viscosity Solution of Bellman-Isaacs Equation Arising in Non-Linear Uncertain Object Control
- 2015
1st Conference on Modelling, Identification and Control (MICNON 2015) (Saint-Petersburg). Presentation: Control of Nonlinear Uncertain Object in the Problem of Motion along the Given Trajectory
System Identification and Control Problems (SICPRO 2015) (Moscow). Presentation: АЛГОРИТМИЧЕСКОЕ КОНСТРУИРОВАНИЕ В ЗАДАЧАХ ИДЕНТИФИКАЦИИ НЕОПРЕДЕЕЛННЫХ ОБЪЕКТОВ
1st Conference on Modelling, Identification and Control of Nonlinear Systems (MICNON 2015) (Saint-Petersburg). Presentation: Control of Nonlinear Uncertain Object in the Problem of Motion along the Given Trajectory
- 2014
XII ВСЕРОССИЙСКОЕ СОВЕЩАНИЕ ПО ПРОБЛЕМАМ УПРАВЛЕНИЯ ВСПУ-2014 (Москва). Presentation: Управление нелинейным объектом с параметрами, зависящими от состояния, в задаче слежения
- 2010
International Conference on Information Processing and Control Engineering (ICIPCE 2015) (Москва). Presentation: Control of nonlinear uncertain object in the problem of motion along the given trajectory
Parametric Optimization of Nonlinear Systems Represented by Models Using the Extended Linearization Method , Automation and Remote Control, 2021, Vol. 82, No. 2, pp. 245–263. © DOI: 10.1134/S0005117921020053
Differential game in the problem of controlling a nonlinear object with restrictions on control actions
Parametric Optimization of Nonline-ar Systems Represented by Models Using the Extended Linearization Method
The optimal control problem formulated for a class of nonlinear objects that can represented as objects with a linear structure and state-dependent parameters. The linear structure of the transformed nonlinear system and the quadratic quality functional allow us to switch from the need to search for solutions of the Hamilton-Jacobi equation to a Riccati-type equation with state-dependent parameters in the synthesis of optimal control. The main problem of implementing optimal control is associated with the problem of finding a solution to such an equation. The article proposes an algorithmic method of parametric optimization of the controller, based on the use of the necessary optimality conditions for the considered control system. The constructed algorithms can be used both for optimization of non-stationary objects themselves, if the corresponding parameters are selected for this purpose, and for optimization of the entire controlled system with the help of the corresponding parametric tuning of the controllers. The effectiveness of the developed algorithms demonstrated by the example of drug treatment of patients with HIV.
Automation and Remote Control, 2021, 82(2), 245-263 рр.
DOI
10.1134/S0005117921020053
Differential Games of Pursuit with Several Pursuers and One Evader
A differential game of several players is considered as follows. One player (attacker) penetrates some space, and several other players (pursuers) appear simultaneously to intercept the attacker. Upon detecting the pursuers, the attacker tries to evade them. The dynamics of each player are described by a time-invariant linear system of a general type with scalar control. A quadratic functional is introduced, and the differential game is treated as an optimal control problem. Two subproblems are solved as follows. The first subproblem is to construct a strategy for pursuing the attacker by several players having complete equal information about the game. The second subproblem is to construct such a strategy under incomplete information about the attacker actively opposing the pursuers. The simulation results are presented. The zero-sum differential game solution can be used for studying the final stage of pursuit, in which several pursuers and one evader participate.
Control Sciences. 2021. №1.21-30 рр DOI: http://doi.org/10.25728/cs.2021.1.3
Tracking Problem under Bounded Disturbances. Algebraic Synthesis Method
We consider the problem of a zero-sum differential tracking game with a quadratic
performance functional in which the plant subjected to uncontrolled disturbances is described by a nonlinear ordinary differential equation. The synthesis of optimal controls is known to necessitate online solving a scalar Bellman–Isaacs partial differential equation that contains information about the trajectory of the process to be monitored. The lack of information about this process over the entire control interval makes the synthesized controls unimplementable. An algebraic method is proposed for solving the Bellman-Isaacs equation, which contains the current value of the monitored process. As an illustration of the results obtained, we give the simulation of the behavior of a nonlinear system with two players with an open control horizon.
Employment history
From 1972 to present - assistant, senior lecturer, associate professor, professor.
Time work: departamena professor of applied mathematics at the Moscow Institute of Electronics and Mathematics.
Visiting Professor (2002-2010): The Bauman Moscow Technical University. Russian University of Peoples' Friendship.
Since 2011, Professor (on conditions of part-time) at Moscow State University (Department of Physics)
Textbook: Mathematical Theory of Control Systems Design.
Mathematical Theory of Control Systems Design. V.N. Afanas’ev, V.B. Kolmanovskii, V.R. Nosov. Kluwer Academic Publisher. Dordrecht/Boston/London. 670 p.
The book is based on several courses of lectures on control theory and applications which were delivered by the authors for a number of years at Moscow Electronics and Mathematics University.
Monography. Control of uncertain dynamic objects
V.N. Afanasiev Control of uncertain dynamic objects. Moscow. Fimatlit. 2008. 208 p.
The book examines the controlled systems, which describe the behavior of linear and nonlinear differential inclusions with fuzzy given initial conditions.
Monography: Control uncertain nonlinear dynamic objects
V. N. Afanasiev. Control uncertain nonlinear dynamic objects
The book is devoted to a systematic exposition of the methods of mathematical design of nonlinear uncertain dynamical systems, systems can be represented with parameters depending on the state. Material book may be of interest for professionals working in the management of a variety of objects, as well as for students and postgraduates of relevant specialties.
‘Mathematics Is Practically Everywhere: in Physics, Programming, Economics, Sociology, Biology, and Medicine’
Applied Mathematics is one of the flagship educational programmes run by the HSE Tikhonov Moscow Institute of Electronics and Mathematics. Anna Presnova, a lecturer at HSE University since 2018, has recently become its Academic Supervisor. She talked about the changes awaiting the programme, her personal research interests, and what it means to be a mother of two children while being involved in research, teaching and administration at the same time.
HSE Staff Members Awarded Status of Tenured Professor
On June 22, several HSE lecturers and staff members were awarded the status of Tenured Professor at a meeting of HSE Academic Council. Sixteen HSE staff members became Distinguished Professors at the Higher School of Economics for the first time.