AbstractThis paper attempts to give a practical method to compute global periodic solutions of autonomous Hamiltonian systems of arbitrary finite order. The proposed numerical method is based on continuation of solutions branching from equlibrium points and requires no iterations. Moreover, during computation of one-parameter families of periodic orbits, their possible bifurcations are determined as well
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
By using minimax methods and critical point theory, we obtain infinitely many periodic solutions fo...
[[abstract]]This article deals with second order periodic Hamiltonian systems. We apply variational ...
We present and review results on the continuation and bifurcation of periodic solutions in conservat...
Altres ajuts: Fundación Séneca de la Región de Murcia grant number 20783/PI/18We deal with non-auton...
Abstract. We describe a method to study the existence of whiskered quasi-periodic solutions in Hamil...
Under an appropriate oscillating behavior of the nonlinear term, the existence of infinitely many pe...
AbstractIn this paper, we study the existence of periodic solutions for classical Hamiltonian system...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
Continuation is an efficient algorithm for finding solutions of systems of nonlinear algebraic equat...
This master's thesis deals with qualitative analysis of nonlinear differential equations of second o...
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
By using minimax methods and critical point theory, we obtain infinitely many periodic solutions fo...
[[abstract]]This article deals with second order periodic Hamiltonian systems. We apply variational ...
We present and review results on the continuation and bifurcation of periodic solutions in conservat...
Altres ajuts: Fundación Séneca de la Región de Murcia grant number 20783/PI/18We deal with non-auton...
Abstract. We describe a method to study the existence of whiskered quasi-periodic solutions in Hamil...
Under an appropriate oscillating behavior of the nonlinear term, the existence of infinitely many pe...
AbstractIn this paper, we study the existence of periodic solutions for classical Hamiltonian system...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
The bifurcation theory and numerics of periodic orbits of general dynamical systems is well develope...
Continuation is an efficient algorithm for finding solutions of systems of nonlinear algebraic equat...
This master's thesis deals with qualitative analysis of nonlinear differential equations of second o...
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Aim of the paper is to provide a method to analyze the behavior of T-periodic solutions x(epsilon), ...
Limit cycles or, more general, periodic solutions of nonlinear dynamical systems occur in many diffe...
By using minimax methods and critical point theory, we obtain infinitely many periodic solutions fo...
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