Mellin transforms of multivariate rational functions
Abstract
This paper deals with Mellin transforms of rational functions in several variables. We prove that the polar set of such a Mellin transform consists of finitely many families of parallel hyperplanes, with all planes in each such family being integral translates of a specific facial hyperplane of the Newton polytope of the denominator . The Mellin transform is naturally related to the so called coamoeba , where is the zero locus of and denotes the mapping that takes each coordinate to its argument. In fact, each connected component of the complement of the coamoeba gives rise to a different Mellin transform. The dependence of the Mellin transform on the coefficients of , and the relation to the theory of -hypergeometric functions is also discussed in the paper.
Cite
@article{arxiv.1010.5060,
title = {Mellin transforms of multivariate rational functions},
author = {Lisa Nilsson and Mikael Passare},
journal= {arXiv preprint arXiv:1010.5060},
year = {2010}
}