English

Multiple sign-changing solutions for semilinear subelliptic Dirichlet problem

Analysis of PDEs 2025-10-14 v1

Abstract

We study the following perturbation from symmetry problem for the semilinear subelliptic equation {Xu=f(x,u)+g(x,u)\mboxin Ω,uHX,01(Ω),\hfill \left\{ \begin{array}{cc} -\triangle_{X} u=f(x,u)+g(x,u) & \mbox{in}~\Omega, \\[2mm] u\in H_{X,0}^{1}(\Omega),\hfill \end{array} \right. where X=i=1mXiXi\triangle_{X}=-\sum_{i=1}^{m}X_{i}^{*}X_{i} is the self-adjoint sub-elliptic operator associated with H\"{o}rmander vector fields X=(X1,X2,,Xm)X=(X_{1},X_{2},\ldots,X_{m}), Ω\Omega is an open bounded subset in Rn\mathbb{R}^n, and HX,01(Ω)H_{X,0}^{1}(\Omega) denotes the weighted Sobolev space. We establish multiplicity results for sign-changing solutions using a perturbation method alongside refined techniques for invariant sets. The pivotal aspect lies in the estimation of the lower bounds of min-max values associated with sign-changing critical points. In this paper, we construct two distinct lower bounds of these min-max values. The first one is derived from the lower bound of Dirichlet eigenvalues of X-\triangle_{X}, while the second one is based on the Morse-type estimates and Cwikel-Lieb-Rozenblum type inequality in degenerate cases. These lower bounds provide different sufficient conditions for multiplicity results, each with unique advantages and are not mutually inclusive, particularly in the general non-equiregular case. This novel observation suggests that in some sense, the situation for sub-elliptic equations would have essential difference from the classical elliptic framework.

Keywords

Cite

@article{arxiv.2510.10120,
  title  = {Multiple sign-changing solutions for semilinear subelliptic Dirichlet problem},
  author = {Hua Chen and Hong-Ge Chen and Jin-Ning Li and Xin Liao},
  journal= {arXiv preprint arXiv:2510.10120},
  year   = {2025}
}

Comments

47 pages

R2 v1 2026-07-01T06:31:08.692Z