Critical Ambrosetti-Prodi type problems on Carnot groups

Abstract

In this paper, we investigate a class of critical Ambrosetti-Prodi type problems involving the sub-Laplacian on a Carnot group. Specifically, we consider \[ \ aligned -G u &= λ u + u+2Q*-1 + f() &&in ,\\[2mm] u &= 0 &&on ∂, aligned . \] where G is the sub-Laplacian on a Carnot group G, ⊂ G is an open bounded domain with smooth boundary, λ>0 is a real parameter, f∈ L∞(), u+ denotes the positive part of u, and 2Q* is the critical Sobolev exponent associated with the homogeneous dimension Q. Motivated by the classical Ambrosetti-Prodi problem, we establish existence and multiplicity results for the cases λ<λ1 and λ>λ1, where λk denotes the k-th Dirichlet eigenvalue of -G. We also prove the existence of solutions at resonance when λ=λ1 and show that bifurcation occurs from each eigenvalue λk, k >1.