Brezis-Nirenberg type result for Kohn Laplacian with critical Choquard Nonlinearity

Abstract

In this article, we are study the following Dirichlet problem with Choquard type non linearity \[ -H u = a u+ (∫|u(η)|Q*λ|η-1|λdη)|u|Q*λ-2u \; in\; , u = 0 \; on ∂ , \] where is a smooth bounded subset of the Heisenberg group HN, N∈ N with C2 boundary and H is the Kohn Laplacian on the Heisenberg group HN. Here, Q*λ=2Q-λQ-2,\; Q= 2N+2 and a is a positive real parameter. We derive the Brezis-Nirenberg type result for the above problem. Moreover, we also prove the regularity of solutions and nonexistence of solutions depending on the range of a.