Weighted Choquard equation perturbed with weighted nonlocal term

Abstract

We investigate the following problem - div(v(x)|∇ u|m-2∇ u)+V(x)|u|m-2u= (|x|-θ*|u|b|x|α)|u|b-2|x|αu+λ(|x|-γ*|u|c|x|β)|u|c-2|x|βu in N, where b, c, α, β >0, θ,γ ∈ (0,N), N≥ 3, 2≤ m< ∞ and λ ∈ . Here, we are concerned with the existence of groundstate solutions and least energy sign-changing solutions and that will be done by using the minimization techniques on the associated Nehari manifold and the Nehari nodal set respectively.