Add to ORKGRelevance of the research work. In addition to the construction of stable differential circuits with nonlinear effects and visualization of the approximate solution using modern computer technologies, linearization methods are also relevant. In mathematical modeling, it was confirmed that the calculation experiment was successful, applying qualitative and analytical methods of automodel and approximate-automodel equations, as well as the theory of special derivative equations. The main aspect and complexity of the studied mathematical models is that the solution is not unique. It is this aspect that distinguishes them from classical problems with a single solution. The scientific novelty of this research work consists in the numerical and a...
In this report, a method for approximating the stabilizing solution of the Hamilton-Jacobi equation ...
In this paper, an analytical approximation approach for the stabilizing solution of the Hamilton-Jac...
In this report, a method for approximating the stabilizing solution of the Hamilton-Jacobi equation ...
This thesis presents the theory of Hamilton-Jacobi equations. It is first shown how the equation is ...
We will present some numerical schemes for some non classical Hamilton-Jacobi equations. We will con...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
I present two recent research directions in this dissertation. The first direction is on the study o...
The book is devoted to the description and application of methods of generalized and functional sepa...
This master's thesis has two main goals. First, to give a rigorous presentation of the method of ch...
This dissertation presents a general methodology for solving the optimal feedback control problem in...
This dissertation presents a general methodology for solving the optimal feedback control problem in...
This paper presents a numerical approach to solve the Hamilton-Jacobi-Bellman (HJB) equation, which ...
We propose a new approach on how to obtain the approximate solutions of Hamilton-Jacobi (HJ) equatio...
In this chapter we present recent developments in the theory of Hamilton–Jacobi–Bellman (HJB) equati...
Integration of Hamilton-Jacobi partial differential equation using Euler equations and Legendre tran...
In this report, a method for approximating the stabilizing solution of the Hamilton-Jacobi equation ...
In this paper, an analytical approximation approach for the stabilizing solution of the Hamilton-Jac...
In this report, a method for approximating the stabilizing solution of the Hamilton-Jacobi equation ...
This thesis presents the theory of Hamilton-Jacobi equations. It is first shown how the equation is ...
We will present some numerical schemes for some non classical Hamilton-Jacobi equations. We will con...
In this article, we first introduce aLax-Friedrichs type finite difference method to compute the $\m...
I present two recent research directions in this dissertation. The first direction is on the study o...
The book is devoted to the description and application of methods of generalized and functional sepa...
This master's thesis has two main goals. First, to give a rigorous presentation of the method of ch...
This dissertation presents a general methodology for solving the optimal feedback control problem in...
This dissertation presents a general methodology for solving the optimal feedback control problem in...
This paper presents a numerical approach to solve the Hamilton-Jacobi-Bellman (HJB) equation, which ...
We propose a new approach on how to obtain the approximate solutions of Hamilton-Jacobi (HJ) equatio...
In this chapter we present recent developments in the theory of Hamilton–Jacobi–Bellman (HJB) equati...
Integration of Hamilton-Jacobi partial differential equation using Euler equations and Legendre tran...
In this report, a method for approximating the stabilizing solution of the Hamilton-Jacobi equation ...
In this paper, an analytical approximation approach for the stabilizing solution of the Hamilton-Jac...
In this report, a method for approximating the stabilizing solution of the Hamilton-Jacobi equation ...