Numerical analysis of nonlinear eigenvalue problems

Abstract

We provide a priori error estimates for variational approximations of the ground state eigenvalue and eigenvector of nonlinear elliptic eigenvalue problems of the form -div (A∇ u) + Vu + f(u2) u = λu, \|u\|L2=1. We focus in particular on the Fourier spectral approximation (for periodic problems) and on the ¶1 and ¶2 finite-element discretizations. Denoting by (uδ,λδ) a variational approximation of the ground state eigenpair (u,λ), we are interested in the convergence rates of \|uδ-u\|H1, \|uδ-u\|L2 and |λδ-λ|, when the discretization parameter δ goes to zero. We prove that if A, V and f satisfy certain conditions, |λδ-λ| goes to zero as \|uδ-u\|H12+\|uδ-u\|L2. We also show that under more restrictive assumptions on A, V and f, |λδ-λ| converges to zero as \|uδ-u\|H12, thus recovering a standard result for linear elliptic eigenvalue problems. For the latter analysis, we make use of estimates of the error uδ-u in negative Sobolev norms.