summary:A modification of a classical number-theorem on Diophantine approximations is used for generalizing H. kielhöfer's result on bifurcations of nontrivial periodic solutions to nonlinear wave equations
AbstractWe study the bifurcation problem for periodic solutions of a nonautonomous damped wave equat...
In this paper we obtain sufficient conditions for the existence of doubly periodic solutions of the ...
We consider here the problem u,,-- u ~ = ok(t, 3)+ g(u), (t, z) r R 2, (1) u(t q- T, "c)- ~ u(...
summary:A modification of a classical number-theorem on Diophantine approximations is used for gener...
Stable periods of a semilinear wave equation and bifurcation of periodic solutions / by H. Kielhöfer...
In 1978, P. Rabinowitz proved a theorem concerned with the existence of a nontrivial periodic soluti...
AbstractIn this paper we apply previously obtained abstract bifurcation results to nonlinear perturb...
We prove bifurcation of Cantor families of periodic solutions for wave equations with nonlinearities...
Some classical types of nonlinear periodic wave motion are studied in special coor-dinates. In the c...
We are concerned with multiplicity and bifurcation results for solutions of nonlinear second order d...
We use the bifurcation method of dynamical systems to study the periodic wave solutions and their li...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
We study the bifurcation problem for periodic solutions of a nonautonomous damped wave equation defi...
A class of doubly periodic waves for several nonlinear evolution equations is studied by the Hirota ...
AbstractBifurcation of time periodic solutions and their regularity are proved for a semilinear wave...
AbstractWe study the bifurcation problem for periodic solutions of a nonautonomous damped wave equat...
In this paper we obtain sufficient conditions for the existence of doubly periodic solutions of the ...
We consider here the problem u,,-- u ~ = ok(t, 3)+ g(u), (t, z) r R 2, (1) u(t q- T, "c)- ~ u(...
summary:A modification of a classical number-theorem on Diophantine approximations is used for gener...
Stable periods of a semilinear wave equation and bifurcation of periodic solutions / by H. Kielhöfer...
In 1978, P. Rabinowitz proved a theorem concerned with the existence of a nontrivial periodic soluti...
AbstractIn this paper we apply previously obtained abstract bifurcation results to nonlinear perturb...
We prove bifurcation of Cantor families of periodic solutions for wave equations with nonlinearities...
Some classical types of nonlinear periodic wave motion are studied in special coor-dinates. In the c...
We are concerned with multiplicity and bifurcation results for solutions of nonlinear second order d...
We use the bifurcation method of dynamical systems to study the periodic wave solutions and their li...
This thesis is concerned with the water wave problem. Using local bifurcation we establish small-amp...
We study the bifurcation problem for periodic solutions of a nonautonomous damped wave equation defi...
A class of doubly periodic waves for several nonlinear evolution equations is studied by the Hirota ...
AbstractBifurcation of time periodic solutions and their regularity are proved for a semilinear wave...
AbstractWe study the bifurcation problem for periodic solutions of a nonautonomous damped wave equat...
In this paper we obtain sufficient conditions for the existence of doubly periodic solutions of the ...
We consider here the problem u,,-- u ~ = ok(t, 3)+ g(u), (t, z) r R 2, (1) u(t q- T, "c)- ~ u(...
DOI
Add to ORKG