The splitting lemmas for nonsmooth functionals on Hilbert spaces
Abstract
The usual Gromoll-Meyer's generalized Morse lemma near degenerate critical points on Hilbert spaces, so called splitting lemma, is stated for at least -smooth functionals. In this paper we establish a splitting theorem and a shifting theorem for a class of continuously directional differentiable functionals (lower than ) on a Hilbert space which have higher smoothness (but lower than ) on a densely and continuously imbedded Banach space near a critical point lying in . (This splitting theorem generalize almost all previous ones to my knowledge). Moreover, a new theorem of Poincar\'e-Hopf type and a relation between critical groups of the functional on and are given. The corresponding version at critical submanifolds is presented. We also generalize the Bartsch-Li's splitting lemma at infinity in \cite{BaLi} and some variants of it to a class of continuously directional differentiable functionals on Hilbert spaces. Our proof methods are to combine the proof ideas of the Morse-Palais lemma due to Duc-Hung-Khai \cite{DHK} with some techniques from \cite{JM, Skr, Va1}. Our theory is applicable to the Lagrangian system on compact manifolds and boundary value problems for a large class of nonlinear higher order elliptic equations.
Cite
@article{arxiv.1102.2062,
title = {The splitting lemmas for nonsmooth functionals on Hilbert spaces},
author = {Guangcun Lu},
journal= {arXiv preprint arXiv:1102.2062},
year = {2012}
}
Comments
This paper has been withdrawn by the author. 109 pages. This paper has been withdrawn since it got split into 3 parts