On the convergence of Fourier spectral methods involving non-compact operators

Abstract

Motivated by Fredholm theory, we develop a framework to establish the convergence of spectral methods for operator equations L u = f. The framework posits the existence of a left-Fredholm regulator for L and the existence of a sufficiently good approximation of this regulator. Importantly, the numerical method itself need not make use of this extra approximant. We apply the framework to Fourier finite-section and collocation-based numerical methods for solving differential equations with periodic boundary conditions and to solving Riemann--Hilbert problems on the unit circle. We also obtain improved results concerning the approximation of eigenvalues of differential operators with periodic coefficients.