THE COMPUTATION OF THE SPECTRA OF HIGHLY OSCILLATORY FREDHOLM INTEGRAL OPERATORS

摘要

We are concerned with the computation of spectra of highly oscillatory Fredholm problems, in particular with the Fox-Li operator ∫_(-1)~1 f(x)e~(iω)(x-y)~2 dx = λf(y), —1 ≤ y ≤ 1, where ω 1. Our main tool is the finite section method: an eigenfunction is expanded in an orthonormal basis of the underlying space, resulting in an algebraic eigenvalue problem. We consider two competing bases: a basis of Legendre polynomials and a basis consisting of modified Fourier functions ( cosines and shifted sines), and derive detailed asymptotic estimates of the rate of decay of the coefficients. Although the Legendre basis enjoys in principle much faster convergence, this does not lead to much smaller matrices. Since the computation of Legendre coefficients is expensive, while modified Fourier coefficients can be computed efficiently with FFT, we deduce that modified Fourier expansions, implemented in a manner that takes advantage of their structure, present a considerably more effective tool for the computation of highly oscillatory Fredholm spectra.