The GKZ hypergeometric D-module

Abstract

For an (n× N)-matrix A of rank n with integer entries, Gelfand, Kapranov and Zelevinsky introduce a system of differential equations, called the A-hypergeometric system. We define the stable GKZ hypergeometric D-module using cohomological functors, which is closely related to the A-hypergeometric D-module and the D-module underlying the better behaved GKZ system introduced by Borisov and Horja. We prove the stable GKZ hypergeometric D-module is holonomic and is an integrable connection of rank n!vol(∞) on the Zariski open subset parametrizing nondegenerate Laurent polynomials, where ∞ is the Newton polytope at ∞.