Add to ORKGWe consider the problem of computing the Liapunov and the period constants for a smooth differential equation with a non degenerate critical point. First, we investigate the structure of both constants when they are regarded as polynomials on the coefficients of the differential equation. Secondly, we take advantadge of this structure to derive a method to obtain the explicit expression of the above-mentioned constants. Although this method is based on the use of the Runge-Kutta-Fehlberg methods of orders 7 and 8 and the use of Richardson's extrapolation, it provides the real expression for these constants
AbstractThis paper studies the “internal structure” of the periodic solutions of differential equati...
The paper deals with the problem of investigation of eigenvalues of the monodromy operator for perio...
AbstractNon-continuability of solutions of ordinary differential equations on ¦t0, ∞) is investigate...
In this paper, we study systems in the plane having a critical point with pure imaginary eigenvalues...
Abstract. In this paper, a numerical programming for Liapunov index of differential equations with p...
In this paper, we present a new approach for constructing Liapunov functions[Rao, 1980] for differen...
Abstract: Approximate stability analysis of nonlinear delay differential algebraic equations (DDAEs)...
A perturbative procedure based on the Lie-Deprit algorithm of classical mechanics is proposed to co...
As for the periodic differential equations, M. Urabe [8] developed Galerkin method for numerical ana...
The present paper, together with the previous one (Part 1: Theory, published in this journal) is int...
AbstractIntegrability and linearizability of polynomial differential systems are studied. The comput...
AbstractIn this paper we describe a mechanical procedure for computing the Liapunov functions and Li...
With a view to the researches on asymptotic properties for linear differential systems, the characte...
A numerical method which basically utilizes the Liapunov Direct Method is presented which establishe...
Liapunov functions are constructed for nonlinear systems of ordinary differential equations whose li...
AbstractThis paper studies the “internal structure” of the periodic solutions of differential equati...
The paper deals with the problem of investigation of eigenvalues of the monodromy operator for perio...
AbstractNon-continuability of solutions of ordinary differential equations on ¦t0, ∞) is investigate...
In this paper, we study systems in the plane having a critical point with pure imaginary eigenvalues...
Abstract. In this paper, a numerical programming for Liapunov index of differential equations with p...
In this paper, we present a new approach for constructing Liapunov functions[Rao, 1980] for differen...
Abstract: Approximate stability analysis of nonlinear delay differential algebraic equations (DDAEs)...
A perturbative procedure based on the Lie-Deprit algorithm of classical mechanics is proposed to co...
As for the periodic differential equations, M. Urabe [8] developed Galerkin method for numerical ana...
The present paper, together with the previous one (Part 1: Theory, published in this journal) is int...
AbstractIntegrability and linearizability of polynomial differential systems are studied. The comput...
AbstractIn this paper we describe a mechanical procedure for computing the Liapunov functions and Li...
With a view to the researches on asymptotic properties for linear differential systems, the characte...
A numerical method which basically utilizes the Liapunov Direct Method is presented which establishe...
Liapunov functions are constructed for nonlinear systems of ordinary differential equations whose li...
AbstractThis paper studies the “internal structure” of the periodic solutions of differential equati...
The paper deals with the problem of investigation of eigenvalues of the monodromy operator for perio...
AbstractNon-continuability of solutions of ordinary differential equations on ¦t0, ∞) is investigate...