Add to ORKGWhen exists , the periodic solutions of x" +Ax = f form n-dimensional subspaces in the function space, where n= dim Ker A =n . We prove four results about persistence of similar properties for periodic solutions iof nonlinear second order equations in terms of continua with covering dimension n that can be globally continued
summary:This paper is concerned with periodic solutions of first-order nonlinear functional differen...
AbstractIt is shown that there are plenty of quasi-periodic solutions of nonlinear Schrödinger equat...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
When exists , the periodic solutions of x" +Ax = f form n-dimensional subspaces in the function spac...
AbstractIf a nonlinear autonomous n-dimensional system of ordinary differential equations has a boun...
3noWe prove the existence of periodic solutions of some infinite-dimensional systems by the use of t...
Abstract. Theorems on the existence of a continuum of twice periodic solutions with all amplitudes f...
AbstractWe discuss the existence of global or periodic solutions to the nonlinear wave equation [utt...
AbstractBifurcations of periodic solutions are studied for certain types of weakly perturbed partial...
we describe a Lindestd series approach to the study of periodic solutions for classes of non linear ...
AbstractHere we are concerned with the problem of the existence of periodic solution for certain sec...
AbstractGeneral homotopy continuation and bifurcation results are discussed and proved for a class o...
AbstractWe study the existence of periodic solutions to differential equations of the formL(x)+g(t,x...
The existence of periodic solutions of second-order differential equations has been studied permanen...
Preprintt Let F be a real or complex n-dimensional map. It is said that F is globally periodic if t...
summary:This paper is concerned with periodic solutions of first-order nonlinear functional differen...
AbstractIt is shown that there are plenty of quasi-periodic solutions of nonlinear Schrödinger equat...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...
When exists , the periodic solutions of x" +Ax = f form n-dimensional subspaces in the function spac...
AbstractIf a nonlinear autonomous n-dimensional system of ordinary differential equations has a boun...
3noWe prove the existence of periodic solutions of some infinite-dimensional systems by the use of t...
Abstract. Theorems on the existence of a continuum of twice periodic solutions with all amplitudes f...
AbstractWe discuss the existence of global or periodic solutions to the nonlinear wave equation [utt...
AbstractBifurcations of periodic solutions are studied for certain types of weakly perturbed partial...
we describe a Lindestd series approach to the study of periodic solutions for classes of non linear ...
AbstractHere we are concerned with the problem of the existence of periodic solution for certain sec...
AbstractGeneral homotopy continuation and bifurcation results are discussed and proved for a class o...
AbstractWe study the existence of periodic solutions to differential equations of the formL(x)+g(t,x...
The existence of periodic solutions of second-order differential equations has been studied permanen...
Preprintt Let F be a real or complex n-dimensional map. It is said that F is globally periodic if t...
summary:This paper is concerned with periodic solutions of first-order nonlinear functional differen...
AbstractIt is shown that there are plenty of quasi-periodic solutions of nonlinear Schrödinger equat...
International audienceWe use a Floquet theory for quasi-periodic linear ordinary differential equati...