Existence and regularity for an entire Grushin-Choquard equation

Abstract

We consider the following Choquard equation -γ u + u = (d(z)-μ |u|p)|u|p-2u, in RN, where γ is the Grushin operator. For a suitable range of the parameter p we prove the existence of a mountain pass solution of the equation and we establish that the solution belongs to Lq(RN) for all q∈ [2,∞] and to C0,αloc(RN) for some α ∈ (0,1). Additionally, we provide a Poho zaev type identity, which allows us to derive a nonexistence result for smooth solutions to our equation.

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