Skip to main content
Article

On the convergence rate of a modified Fourier series

Sheehan OlverOxford University Computing Laboratory, Wolfson Building, Parks Road, Oxford, United Kingdom
2009en
ABI

Abstract

The rate of convergence for an orthogonal series that is a minor modification of the Fourier series is proved. This series converges pointwise at a faster rate than the Fourier series for nonperiodic functions. We present the error as an asymptotic expansion, where the lowest term in this expansion is of asymptotic order two. Subtracting out the terms from this expansion allows us to increase the order of convergence, though the terms of this expansion depend on derivatives. Alternatively, we can employ extrapolation methods which achieve higher convergence rates using only the coefficients of the series. We also present a method for the efficient computation of the coefficients in the series.

Identifiers

Citations and references

Cited by 20 references