Critical Equations Involving Nonlocal Subelliptic Operators on Stratified Lie Groups: Spectrum, Bifurcation and Multiplicity

Abstract

In this paper, we explore the bifurcation phenomena and establish the existence of multiple solutions for the nonlocal subelliptic Brezis-Nirenberg problem: equation* cases (-G)s u= |u|2s*-2u+λ u &in , \\ u=0 & in G , cases equation* where (-G)s is the fractional sub-Laplacian on the stratified Lie group G with homogeneous dimension Q, is a open bounded subset of G, s ∈ (0,1), Q> 2s, 2s*:=2QQ-2s is subelliptic fractional Sobolev critical exponent, λ>0 is a real parameter. This work extends the seminal contributions of Cerami, Fortunato, and Struwe to nonlocal subelliptic operators on stratified Lie groups. A key component of our study involves analyzing the subelliptic (s, p)-eigenvalue problem for the (nonlinear) fractional p-sub-Laplacian (-p,G)s align* (-p,G)s u&=λ |u|p-2u,~in~, u&=0~ in ~G, align* with 0<s<1<p<∞ and Q>ps, over the fractional Folland-Stein-Sobolev spaces on stratified Lie groups applying variational methods. Particularly, we prove that the (s, p)-spectrum of (-p,G)s is closed and the second eigenvalue λ2() with λ2()>λ1() is well-defined and provides a variational characterization of λ2(). We emphasize that the results obtained here are also novel for G being the Heisenberg group.