On a class of mixed Choquard-Schr\"odinger-Poisson system
Abstract
We study the system \ - u+u+K(x) φ |u|q-2u&=(Iα*|u|p)|u|p-2u && in RN, - φ&=K(x)|u|q&& in RN, . where N≥ 3, α∈ (0,N), p,q>1 and K≥ 0. Using a Pohozaev type identity we first derive conditions in terms of p,q,N,α and K for which no solutions exist. Next, we discuss the existence of a ground state solution by using a variational approach.
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