AbstractIn this paper the bifurcation of a homoclinic orbit is studied for an ordinary differential equation with periodic perturbation. Exponential trichotomy theory with the method of Lyapunov–Schmidt is used to obtain some sufficient conditions to guarantee the existence of homoclinic solutions and periodic solutions for this problem. Some known results are extended
AbstractDifferential equations are considered which contain a small parameter. When the parameter is...
The bifurcation of the birth of a closed invariant curve in the two-parameter unfolding of a two-dim...
We present a numerical method to locate periodic orbits near homoclinic orbits. Using a method of [X...
AbstractIn this paper the bifurcation of a homoclinic orbit is studied for an ordinary differential ...
AbstractBy using Lyapunov–Schmidt reduction and exponential dichotomies, the persistence of homoclin...
AbstractIn this paper we discuss a small nonautonomous perturbation of an autonomous system on Rn wh...
A general geometric approach is given for bifurcation problems with homoclinic orbits to nonhyperbol...
AbstractProblems of bifurcations from homoclinic to periodic orbits are considered for periodic sing...
AbstractWe study bifurcations of homoclinic orbits to hyperbolic saddle equilibria in a class of fou...
AbstractRegarding the small perturbation as a parameter in an appropriate space of functions, we can...
AbstractConsider the equation ẍ − x + x2 = −λ1x + λ2ƒ(t) where ƒ(t + 1) = ƒ(t) and λ = (λ1, λ2) is ...
AbstractWe consider the problem of bifurcation from homoclinic towards periodic orbits for a periodi...
summary:The paper deals with the bifurcation phenomena of heteroclinic orbits for diffeomorphisms. T...
A procedure is derived which allows for a systematic construction of three-dimensional ordinary diff...
AbstractPerturbed discrete systems likexn+1=f(xn)+μg(xn,μ),xn∈RN,n∈Z, when the associated unperturbe...
AbstractDifferential equations are considered which contain a small parameter. When the parameter is...
The bifurcation of the birth of a closed invariant curve in the two-parameter unfolding of a two-dim...
We present a numerical method to locate periodic orbits near homoclinic orbits. Using a method of [X...
AbstractIn this paper the bifurcation of a homoclinic orbit is studied for an ordinary differential ...
AbstractBy using Lyapunov–Schmidt reduction and exponential dichotomies, the persistence of homoclin...
AbstractIn this paper we discuss a small nonautonomous perturbation of an autonomous system on Rn wh...
A general geometric approach is given for bifurcation problems with homoclinic orbits to nonhyperbol...
AbstractProblems of bifurcations from homoclinic to periodic orbits are considered for periodic sing...
AbstractWe study bifurcations of homoclinic orbits to hyperbolic saddle equilibria in a class of fou...
AbstractRegarding the small perturbation as a parameter in an appropriate space of functions, we can...
AbstractConsider the equation ẍ − x + x2 = −λ1x + λ2ƒ(t) where ƒ(t + 1) = ƒ(t) and λ = (λ1, λ2) is ...
AbstractWe consider the problem of bifurcation from homoclinic towards periodic orbits for a periodi...
summary:The paper deals with the bifurcation phenomena of heteroclinic orbits for diffeomorphisms. T...
A procedure is derived which allows for a systematic construction of three-dimensional ordinary diff...
AbstractPerturbed discrete systems likexn+1=f(xn)+μg(xn,μ),xn∈RN,n∈Z, when the associated unperturbe...
AbstractDifferential equations are considered which contain a small parameter. When the parameter is...
The bifurcation of the birth of a closed invariant curve in the two-parameter unfolding of a two-dim...
We present a numerical method to locate periodic orbits near homoclinic orbits. Using a method of [X...