New linking theorems with applications to critical growth elliptic problems with jumping nonlinearities
Abstract
We study critical growth elliptic problems with jumping nonlinearities. Standard linking arguments based on decompositions of H10() into eigenspaces of - cannot be used to obtain nontrivial solutions to such problems. We show that the associated variational functional admits certain linking structures based on splittings of H10() into nonlinear submanifolds. In order to capture these linking geometries, we prove several generalizations of the classical linking theorem of Rabinowitz that are not based on linear subspaces. We then use these new linking theorems to obtain nontrivial solutions of our problems. Our abstract results are of independent interest and can be used to obtain nontrivial solutions of other types of problems with jumping nonlinearities as well.
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