Ground states for asymptotically linear fractional Schrodinger-Poisson systems

In this paper we consider the following fractional Schrodinger-Poisson system (-Delta )su+u+K(x)phi (x)u=g(x,u), x is an element of R3,(-Delta )s phi =K(x)u2, x is an element of R3, where s is an element of(<mml:mfrac>12</mml:mfrac>,1) and g(x, u) is asymptotically linear at infinity. Under certain assumptions on K(x) and g(x, u), we prove the existence of ground state solutions by variational methods.