WEYL GROUP MULTIPLE DIRICHLET SERIES OF TYPE A2

Authors

G Chinta
PE Gunnells, University of Massachusetts - AmherstFollow

Publication Date

2007

Abstract

A Weyl group multiple Dirichlet series is a Dirichlet series in several complex variables attached to a root system . The number of variables equals the rank r of the root system, and the series satisfies a group of functional equations isomorphic to the Weyl group W of . In this paper we construct a Weyl group multiple Dirichlet series over
the rational function field using nth order Gauss sums attached to the root system of type A2. The basic technique is that of [8, 9]; namely, we construct a rational function in r variables invariant under a certain action of W, and use this to build a “local factor” of the global series.

Comments

This is the pre-published version harvested from ArXiv.

Recommended Citation

Chinta, G and Gunnells, PE, "WEYL GROUP MULTIPLE DIRICHLET SERIES OF TYPE A2" (2007). Mathematics and Statistics Department Faculty Publication Series. 1185.
Retrieved from https://scholarworks.umass.edu/math_faculty_pubs/1185