AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a number of new algorithms for solving a system of non-linear equations. The algorithms are of the “steepest descent” type. The advantage of the methodology presented is that it improves the convergence of the solution and moreover, allows an exact prespecification of the finite time in which the solution is obtained. This is achieved with various Lyapunov functions
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
In this paper we show how to improve the approximate solution of the large Lyapunov equation obtaine...
Ordinary differential equations arise in a variety of applications, including climate modeling, elec...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
The article is aimed to give a brief review of works published by authors during at least last 10 ye...
The paper proposes a numerical algorithm for constructing Lyapunov functions for investigating the a...
AbstractThe Lyapunov matrix equation AX+XA⊤=B is N-stable when all eigenvalues of the real n×n matri...
The use of Lyapunov's direct method in obtaining regions of asymptotic stability of non-linear auton...
Lyapunov functions are an essential tool in the stability analysis of dynamical systems, both in the...
The characterization of polynomials whose zeros lie in certain algebraic domains (and the unificatio...
A study is done of solution methods for Linear Matrix Equations including Lyapunov's equation, using...
This paper investigates Lyapunov approaches to expand the domain of attraction (DA) of nonlinear aut...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
The paper proposes a numerical algorithm for constructing Lyapunov spline functions for investigatin...
summary:The paper presents overview of applications of A. M. Lyapunov’s direct method to stability i...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
In this paper we show how to improve the approximate solution of the large Lyapunov equation obtaine...
Ordinary differential equations arise in a variety of applications, including climate modeling, elec...
AbstractThis paper describes how the well-known Lyapunov theory can be used for thedevelopment of a ...
The article is aimed to give a brief review of works published by authors during at least last 10 ye...
The paper proposes a numerical algorithm for constructing Lyapunov functions for investigating the a...
AbstractThe Lyapunov matrix equation AX+XA⊤=B is N-stable when all eigenvalues of the real n×n matri...
The use of Lyapunov's direct method in obtaining regions of asymptotic stability of non-linear auton...
Lyapunov functions are an essential tool in the stability analysis of dynamical systems, both in the...
The characterization of polynomials whose zeros lie in certain algebraic domains (and the unificatio...
A study is done of solution methods for Linear Matrix Equations including Lyapunov's equation, using...
This paper investigates Lyapunov approaches to expand the domain of attraction (DA) of nonlinear aut...
A relaxation of Lyapunov's direct method has been proposed elsewhere that allows for an algorithmic ...
The paper proposes a numerical algorithm for constructing Lyapunov spline functions for investigatin...
summary:The paper presents overview of applications of A. M. Lyapunov’s direct method to stability i...
The paper proposes a numerical algorithm for constructing piecewise linear Lyapunov functions for in...
In this paper we show how to improve the approximate solution of the large Lyapunov equation obtaine...
Ordinary differential equations arise in a variety of applications, including climate modeling, elec...