Abstract
A method is proposed for constructing fast converging Fourier series with the help of a special boundary function Mq. The convergence rate of the series is determined by the order q of Mq, which makes it possible to use a small number of series terms. The general theory of constructing fast expansions is described, the error of the partial sum of a series is estimated, and an example of a non- linear integrodifferential problem is considered. Due to its remarkable properties, the fast expansion method can be effectively used in applications.
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