We consider the effect of a periodic perturbation on the bifurcation behavior of a system of differential equations. It is shown that constant solutions are modified into periodic solutions, and that the perturbations leads to the separation of solution branches. Under certain conditions the system may have no solution in the neighborhood of the bifurcation point
summary:Ordinary differential inclusions depending on small parameters are considered such that the ...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
We study the problem of persistence of $T$-periodic solutions of the celebrated symmetric Euler top ...
We consider the effect of a periodic perturbation on the bifurcation behavior of a system of differe...
We consider the effect of a periodic perturbation on the bifurcation behavior of a system of differe...
summary:Bifurcation phenomena in systems of ordinary differential equations which are invariant with...
AbstractBifurcations of periodic solutions are studied for certain types of weakly perturbed partial...
AbstractThe existence of periodic solutions are studied for certain differential inclusions. Applica...
summary:Chaos generated by the existence of Smale horseshoe is the well-known phenomenon in the theo...
This paper discusses different aspects of bifurcations of periodic solutions in discontinuous system...
AbstractThe paper addresses the problem of bifurcation of periodic solutions from a normally nondege...
Regular and singular disturbed ordinary systems of differential equations have been considered in th...
This paper treats bifurcations of periodic solutions in discontinuous systems of the Filippov type. ...
We are concerned here with the classical problem of Poincaré of persistence of periodic solutions un...
We consider perturbations of the problem (*) - x\u27\u27 + bx = lambda ax, x(0) - x(1) = 0 = x\u27(0...
summary:Ordinary differential inclusions depending on small parameters are considered such that the ...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
We study the problem of persistence of $T$-periodic solutions of the celebrated symmetric Euler top ...
We consider the effect of a periodic perturbation on the bifurcation behavior of a system of differe...
We consider the effect of a periodic perturbation on the bifurcation behavior of a system of differe...
summary:Bifurcation phenomena in systems of ordinary differential equations which are invariant with...
AbstractBifurcations of periodic solutions are studied for certain types of weakly perturbed partial...
AbstractThe existence of periodic solutions are studied for certain differential inclusions. Applica...
summary:Chaos generated by the existence of Smale horseshoe is the well-known phenomenon in the theo...
This paper discusses different aspects of bifurcations of periodic solutions in discontinuous system...
AbstractThe paper addresses the problem of bifurcation of periodic solutions from a normally nondege...
Regular and singular disturbed ordinary systems of differential equations have been considered in th...
This paper treats bifurcations of periodic solutions in discontinuous systems of the Filippov type. ...
We are concerned here with the classical problem of Poincaré of persistence of periodic solutions un...
We consider perturbations of the problem (*) - x\u27\u27 + bx = lambda ax, x(0) - x(1) = 0 = x\u27(0...
summary:Ordinary differential inclusions depending on small parameters are considered such that the ...
We consider periodic solutions which bifurcate from equilibria in simple population models which inc...
We study the problem of persistence of $T$-periodic solutions of the celebrated symmetric Euler top ...