The existence of solutions for a Schrodinger equation with jumping nonlinearities crossing the essential spectrum
Abstract
In this paper, we establish the existence of one solution for a Schr\"odinger equation with jumping nonlinearities: - u+V(x)u=f(x,u), x∈ RN, and u(x) 0, |x| +∞, where V is a potential function on which we make hypotheses, and in particular allow V which is unbounded below, and f(x,u)=au-+bu++g(x,u). No restriction on b is required, which implies that f(x,s)s-1 may interfere with the essential spectrum of -+V for s +∞. Using the truncation method and the Morse theory, we can compute critical groups of the corresponding functional at zero and infinity, then prove the existence of one negative solution.
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