Krajnik, EduardMontesinos Santalucia, VicenteZizler, PeterZizler, Vaclav2015-09-102015-09-102012-100862-7940https://riunet.upv.es/handle/10251/54482The 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 extendedReserva de todos los derechosSingular convolution equationsFast Fourier TransformTempered distributionsPolynomial transfer functionsSimple zerosMATEMATICA APLICADASolving singular convolution equations using the inverse fast Fourier transformArtÃculo10.1007/s10492-012-0032-9Abierto