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Binomial D-modules

2010; Duke University Press; Volume: 151; Issue: 3 Linguagem: Inglês

10.1215/00127094-2010-002

1547-7398

Alicia Dickenstein, Laura Felicia Matusevich, Ezra Miller,

Advanced Topics in Algebra

We study quotients of the Weyl algebra by left ideals whose generators consist of an arbitrary Zd-graded binomial ideal I in C[∂1,…,∂n] along with Euler operators defined by the grading and a parameter β∈Cd. We determine the parameters β for which these D-modules (i) are holonomic (equivalently, regular holonomic, when I is standard-graded), (ii) decompose as direct sums indexed by the primary components of I, and (iii) have holonomic rank greater than the rank for generic β. In each of these three cases, the parameters in question are precisely those outside of a certain explicitly described affine subspace arrangement in Cd. In the special case of Horn hypergeometric D-modules, when I is a lattice-basis ideal, we furthermore compute the generic holonomic rank combinatorially and write down a basis of solutions in terms of associated A-hypergeometric functions. This study relies fundamentally on the explicit lattice-point description of the primary components of an arbitrary binomial ideal in characteristic zero, which we derive in our companion article [DMM]