Global persistence of the unit eigenvectors of perturbed eigenvalue problems in Hilbert spaces

TL;DR

This paper proves a global persistence result for unit eigenvectors in nonlinear eigenvalue problems in Hilbert spaces, extending finite-dimensional results to infinite-dimensional settings under compactness assumptions.

Contribution

It extends previous finite-dimensional eigenvector persistence results to infinite-dimensional Hilbert spaces with compact operators, providing conditions for unboundedness or bifurcation of solution sets.

Findings

Connected component of solutions is either unbounded or meets a different eigenvector.

Results apply to both finite and infinite-dimensional Hilbert spaces.

Extension of prior finite-dimensional eigenvector persistence results.

Abstract

We consider the nonlinear eigenvalue problem $Lx + \varepsilon N(x) = \lambda Cx$, $\|x\|=1$, where $\varepsilon,\lambda$ are real parameters, $L, C\colon G \to H$ are bounded linear operators between separable real Hilbert spaces, and $N\colon S \to H$ is a continuous map defined on the unit sphere of $G$. We prove a global persistence result regarding the set $\Sigma$ of the solutions $(x,\varepsilon,\lambda) \in S \times \mathbb R\times \mathbb R$ of this problem. Namely, if the operators $N$ and $C$ are compact, under suitable assumptions on a solution $p_*=(x_*,0,\lambda_*)$ of the unperturbed problem, we prove that the connected component of $\Sigma$ containing $p_*$ is either unbounded or meets a triple $p^*=(x^*,0,\lambda^*)$ with $p^* \not= p_*$. When $C$ is the identity and $G=H$ is finite dimensional, the assumptions on $(x_*,0,\lambda_*)$ mean that $x_*$ is an eigenvector of $L$ whose corresponding eigenvalue $\lambda_*$ is simple. Therefore, we extend a previous result obtained by the authors in the finite dimensional setting. Our work is inspired by a paper of R. Chiappinelli concerning the local persistence property of the unit eigenvectors of perturbed self-adjoint operators in a real Hilbert space.