New type of solutions for Schr\"odinger equations with critical growth
Abstract
We consider the following nonlinear Schr\"odinger equations with critical growth: equation - u + V(|y|)u=uN+2N-2, u>0 \ \ in \ RN, equation where V(|y|) is a bounded positive radial function in C1, N 5. By using a finite reduction argument, we show that if r2V(r) has either an isolated local maximum or an isolated minimum at r0>0 with V(r0)>0, there exists infinitely many non-radial large energy solutions which are invariant under some sub-groups of O(3).
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