Stability and instability results for sign-changing solutions to second-order critical elliptic equations

TL;DR

This paper studies the stability of sign-changing solutions to a critical elliptic PDE on certain Riemannian manifolds, showing precompactness under specific geometric conditions and providing counterexamples to demonstrate the sharpness of these conditions.

Contribution

It establishes stability results for sign-changing solutions to a critical elliptic equation on locally conformally flat manifolds, with new counterexamples in all dimensions.

Findings

Sign-changing solutions are precompact under certain geometric conditions.

Counterexamples show the necessity of assumptions for stability.

Results depend on the manifold's conformal flatness and scalar curvature conditions.

Abstract

On a smooth, closed Riemannian manifold $\left(M,g\right)$ of dimension $n\ge3$, we consider the stationary Schr\"odinger equation $\Delta_gu+h_0u=\left|u\right|^{2^*-2}u$, where $\Delta_g:=-\text{div}_g\nabla$, $h_0\in C^1\left(M\right)$ and $2^* :=\frac{2n}{n-2}$. We prove that, up to perturbations of the potential function $h_0$ in $C^1\left(M\right)$, the sets of sign-changing solutions that are bounded in $H^1\left(M\right)$ are precompact in the $C^2$ topology. We obtain this result under the assumptions that $\left(M,g\right)$ is locally conformally flat, $n\ge7$ and $h_0\ne\frac{n-2}{4\left(n-1\right)}\text{Scal}_g$ at all points in $M$, where $\text{Scal}_g$ is the scalar curvature of the manifold. We then provide counterexamples in every dimension $n\ge3$ showing the optimality of these assumptions.