Existence of nontrivial solutions for fractional Schrodinger-Poisson system with sign-changing potentials

In this paper, we consider the following fractional Schrodinger-Poisson system {(-Delta)alpha u+ V(x)u + K(x)phi u = f(x)vertical bar u vertical bar q-2u, in R-3 (-Delta)t phi = K(x)u2, in R3 where 0< t= a< 1, q. o4; 2* athorn, and 4a+ 2t= 3 and the functions V(x), K(x) and f(x) have finite limits as | x|.8. By imposing some suitable conditions on the decay rate of the functions, we prove that the above system has two nontrivial solutions. One of them is positive and the other one is sign-changing. Recent results from the literature are generally improved and extended.