Infinitely many solutions for a class of fractional Schrodinger equations coupled with neutral scalar field

Abstract

We study the fractional Schr\"odinger equations coupled with a neutral scalar field (-)s u+V(x)u=K(x)φ u +g(x)|u|q-2u, x∈ R3, (I-)t φ=K(x)u2, x∈ R3, where (-)s and (I-)t denote the fractional Laplacian and Bessel operators with 34 <s<1 and 0<t<1, respectively. Under some suitable assumptions for the external potentials V, K and g, given q∈(1,2)(2,2s*) with 2s*:= 63-2s, with the help of an improved Fountain theorem dealing with a class of strongly indefinite variational problems approached by Gu-Zhou [Adv. Nonlinear Stud., 17 (2017), 727--738], we show that the system admits infinitely many nontrivial solutions.