A-Hypergeometric Modules and Gauss--Manin Systems

Abstract

Let A be a d by n integer matrix. Gel'fand et al. proved that most A-hypergeometric systems have an interpretation as a Fourier--Laplace transform of a direct image. The set of parameters for which this happens was later identified by Schulze and Walther as the set of not strongly resonant parameters of A. A similar statement relating A-hypergeometric systems to exceptional direct images was proved by Reichelt. In this article, we consider a hybrid approach involving neighborhoods U of the torus of A and consider compositions of direct and exceptional direct images. Our main results characterize for which parameters the associated A-hypergeometric system is the inverse Fourier-Laplace transform of such a "mixed Gauss-Manin" system. In order to describe which U work for such a parameter, we introduce the notions of fiber support and cofiber support of a D-module. If the semigroup ring of A is normal, we show that every A-hypergeometric system is "mixed Gauss--Manin". We also give an explicit description of the neighborhoods U which work for each parameter in terms of primitive integral support functions.