10.1093/qmath/22.2.291

Solving singular convolution equations using the inverse fast Fourier transform

Abstract

summary:The inverse Fast Fourier Transform is a common procedure to solve a convolution equation provided the transfer function has no zeros on the unit circle. In our paper we generalize this method to the case of a singular convolution equation and prove that if the transfer function is a trigonometric polynomial with simple zeros on the unit circle, then this method can be extended

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Institute of Mathematics AS CR, v. v. i.

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oai:oai.dml.cz:10338.dmlcz/142916Last time updated on 7/9/2019View original full text link

This paper was published in Institute of Mathematics AS CR, v. v. i..

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