From Schwartz space to Mellin transform
Abstract
The primary motivation behind this paper is an attempt to provide a thorough explanation of how the Mellin transform arises naturally in a process akin to the construction of the celebrated Gelfand transform. We commence with a study of a class of Schwartz functions where is the set of all positive real numbers. Various properties of this Fr\'echet space are established and what follows is an introduction of the Mellin convolution operator, which turns into a commutative Fr\'echet algebra. We provide a simple proof of Mellin-Young convolution inequality and go on to prove that the structure space (the space of nonzero, linear, continuous and multiplicative functionals ) is homeomorphic to Finally, we show that the Mellin transform arises in a process which bears a striking resemblance to the construction of the Gelfand transform.
Cite
@article{arxiv.2207.10706,
title = {From Schwartz space to Mellin transform},
author = {Mateusz Krukowski},
journal= {arXiv preprint arXiv:2207.10706},
year = {2022}
}