Abstract
We study the irregularity of hypergeometric D -modules M A ( β ) via the explicit construction of Gevrey series solutions along coordinate subspaces in X = C n . As a consequence, we prove that along coordinate hyperplanes the combinatorial characterization of the slopes of M A ( β ) given by M. Schulze and U. Walther (2008) in [23] still holds for any full rank integer matrix A. We also provide a lower bound for the dimensions of the spaces of Gevrey solutions along coordinate subspaces in terms of volumes of polytopes and prove the equality for very generic parameters. Holomorphic solutions of M A ( β ) at nonsingular points can be understood as Gevrey solutions of order one along X at generic points and so they are included as a particular case.
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