Fractional magnetic Schr\"odinger equations with potential vanishing at infinity and supercritical exponents

Abstract

This paper focuses on the following class of fractional magnetic Schr\"odinger equations equation* (-)Asu+V(x)u=g( u2)u+λ uq-2u, in RN, equation* where (-)As is the fractional magnetic Laplacian, A :RN → RN is the magnetic potential, s∈ (0,1), N>2s, λ ≥0 is a parameter, V:RN → R is a potential function that may decay to zero at infinity and g: R+ → R is a continuous function with subcritical growth. We deal with supercritical case q≥ 2*s:=2N/(N-2s). Our approach is based on variational methods combined with penalization technique and L∞-estimates.