Add to ORKGIn this short course we shall present a new reformulation of the direct method for stability of nonlinear ordinary differential systems, often called Lyapunov’s second method. The main idea is to construct appropriate auxiliary functions to study the stability without recourse to the explicit form of solutions, or exame of the linear approximation of th
AbstractA basic peculiar Lyapunov functional V is introduced for the dynamical systems generated by ...
A new approach related to construction of admissible functions that do not coincide with the Lyapuno...
It is recognized that there are basically three categories of stability: Laplace, Liapunov, and Poin...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
The stability of nonlinear systems is analyzed by the direct Lyapunov’s method in terms of Lyapunov ...
The topic of this essay is proving the general form of Krasovski\u27s theorem using Lyapunov\u27s se...
The book investigates stability theory in terms of two different measure, exhibiting the advantage o...
Não disponívelThe main purpose of this work is to study sufficient conditions under which we can gua...
The contemporary theory of stability for systems of differential equations is based on the concept o...
Abstract. A new approach is applied in the method of matrix Lyapunov functions and the stability of ...
The notion of stability allows to study the qualitative behavior of dynamical systems. In particular...
AbstractIn the first section, stability-like definitions for ordinary differential equations are der...
AbstractIn this paper, we shall investigate several notions of stability of a general ordinary diffe...
summary:The paper presents overview of applications of A. M. Lyapunov’s direct method to stability i...
This is the first book that deals with practical stability and its development. It presents a system...
AbstractA basic peculiar Lyapunov functional V is introduced for the dynamical systems generated by ...
A new approach related to construction of admissible functions that do not coincide with the Lyapuno...
It is recognized that there are basically three categories of stability: Laplace, Liapunov, and Poin...
PhDMathematicsUniversity of Michigan, Horace H. Rackham School of Graduate Studieshttp://deepblue.li...
The stability of nonlinear systems is analyzed by the direct Lyapunov’s method in terms of Lyapunov ...
The topic of this essay is proving the general form of Krasovski\u27s theorem using Lyapunov\u27s se...
The book investigates stability theory in terms of two different measure, exhibiting the advantage o...
Não disponívelThe main purpose of this work is to study sufficient conditions under which we can gua...
The contemporary theory of stability for systems of differential equations is based on the concept o...
Abstract. A new approach is applied in the method of matrix Lyapunov functions and the stability of ...
The notion of stability allows to study the qualitative behavior of dynamical systems. In particular...
AbstractIn the first section, stability-like definitions for ordinary differential equations are der...
AbstractIn this paper, we shall investigate several notions of stability of a general ordinary diffe...
summary:The paper presents overview of applications of A. M. Lyapunov’s direct method to stability i...
This is the first book that deals with practical stability and its development. It presents a system...
AbstractA basic peculiar Lyapunov functional V is introduced for the dynamical systems generated by ...
A new approach related to construction of admissible functions that do not coincide with the Lyapuno...
It is recognized that there are basically three categories of stability: Laplace, Liapunov, and Poin...