A Levin-type algorithm for accelerating the convergence of Fourier series

In this paper, we propose a general O-type algorithm for accelerating the convergence of sequences. It generalizes some known sequence transformations such as the O-algorithm, the iterated O2, the iterated A 2, and the T-algorithm. Some general convergence acceleration results are given. Some result

The series solutions obtained for transport problems by the separation of variables or the integral transform technique often converge very slowly and the d@erentiated series evaluated at the boundary may fail to converge. A general procedure is presented for developing alternative solutions which a

If the coefficients in a Fourier cosine series, f ðxÞ % f N ¼ P 1 n¼0 a n cosðnxÞ, decrease as a small negative power of n, then one may need millions of terms to sum the series to high accuracy. We show that if the a n are known analytically and have a power series in 1=n, then it is straightforwar

The problems of smoothing data through a transform in the Fourier domain and of retrieving a function from its Fourier coefficients are analyzed in the present paper. For both of them a solution, based on regularization tools, is known. Aim of the paper is to prove strong results of convergence of t