Bifurcation into spectral gaps for strongly indefinite Choquard equations
Abstract
We consider the semilinear elliptic equations \ arrayll &- u+V(x)u=(Iα |u|p)|u|p-2u+λ u for x∈ RN, \\ &u(x) 0 as |x| ∞, array . where Iα is a Riesz potential, p∈(N+αN,N+αN-2), N≥3, and V is continuous periodic. We assume that 0 lies in the spectral gap (a,b) of - + V. We prove the existence of infinitely many geometrically distinct solutions in H1( RN) for each λ∈(a, b), which bifurcate from b if N+αN< p < 1 +2+αN. Moreover, b is the unique gap-bifurcation point (from zero) in [a,b]. When λ=a, we find infinitely many geometrically distinct solutions in H2loc( RN). Final remarks are given about the eventual occurrence of a bifurcation from infinity in λ=a.
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