Non-linear second-order periodic systems with non-smooth potential
Abstract
In this paper we study second order non-linear periodic systems driven by the ordinary vector -Laplacian with a non-smooth, locally Lipschitz potential function. Our approach is variational and it is based on the non-smooth critical point theory. We prove existence and multiplicity results under general growth conditions on the potential function. Then we establish the existence of non-trivial homoclinic (to zero) solutions. Our theorem appears to be the first such result (even for smooth problems) for systems monitored by the -Laplacian. In the last section of the paper we examine the scalar \hbox{non-linear} and semilinear problem. Our approach uses a generalized Landesman--Lazer type condition which generalizes previous ones used in the literature. Also for the semilinear case the problem is at resonance at any eigenvalue.
Cite
@article{arxiv.math/0503087,
title = {Non-linear second-order periodic systems with non-smooth potential},
author = {Evgenia H Papageorgiou and Nikolaos S Papageorgiou},
journal= {arXiv preprint arXiv:math/0503087},
year = {2007}
}
Comments
28 pages