On Irregular Binomial D-modules

Abstract

We prove that a holonomic binomial D--module MA (I,β) is regular if and only if certain associated primes of I determined by the parameter vector β∈ d are homogeneous. We further describe the slopes of MA(I,β) along a coordinate subspace in terms of the known slopes of some related hypergeometric D--modules that also depend on β. When the parameter β is generic, we also compute the dimension of the generic stalk of the irregularity of MA(I,β) along a coordinate hyperplane and provide some remarks about the construction of its Gevrey solutions.