Bifurcation and multiplicity results for critical Grushin-Choquard problems

Abstract

We consider the following nonlocal Brézis-Nirenberg type critical Choquard problem involving the Grushin operator equation* \ aligned -Δγ& u =λu + (∫Ω|u(w)|2*γ,μd(z-w)μdw) |u|2*γ,μ-2u &&in \ Ω, u &= 0 &&on \, ∂ Ω, aligned . equation* where Ω is an open bounded domain in RN, N ≥ 3, with Ω \ x=0\ ≠ , and λ>0 is a parameter. Here, Δγ represents the Grushin operator, defined as \[ Δγu(z) = Δx u(z) +(1+γ)2 |x|2γ Δy u(z), γ≥ 0, \] where z=(x,y)∈ Ω⊂ Rm× Rn, m+n=N ≥ 3 and 2*γ,μ= 2Nγ-μNγ-2 is the Sobolev critical exponent in the Hardy-Littlewood context with Nγ= m+(1+γ)n is the homogeneous dimension associated to the Grushin operator and 0<μ<Nγ. The homogeneous norm related to the Grushin operator is denoted by d(·). In this article, we prove the existence of bifurcation from any eigenvalue λ* of -Δγ under Dirichlet boundary conditions. Furthermore, we show that in a suitable left neighborhood of λ*, the number of nontrivial solutions to the problem is at least twice the multiplicity of λ*.