Projection-based approximations for eigenvalue problems of Fredholm integral operators with Green's kernels

Abstract

We consider the eigenvalue problem K x = λ x. Our analysis focuses on the convergence rates of eigenvalue and spectral subspace approximations for compact linear integral operator K with Green's kernels. By employing orthogonal and interpolatory projections at 2r+1 collocation points (which are not necessarily Gauss points) onto an approximating space of piecewise even degree polynomials, we establish the superconvergence of eigenfunctions under iteration. The modified projection methods achieve a faster convergence rates compared to classical projection methods. The enhancement in convergence rate is verified by numerical examples.