Mathematics – Algebraic Geometry
Scientific paper
2010-07-23
Mathematics
Algebraic Geometry
Terminology changed: see Definition 2.6 in current version. Corrections made to Theorem 6.6, Corollary 6.7 and Corollary 6.8 i
Scientific paper
We study the solutions of irregular A-hypergeometric systems that are constructed from Gr\"obner degenerations with respect to generic positive weight vectors. These are formal logarithmic Puiseux series that belong to explicitly described Nilsson rings, and are therefore called (formal) Nilsson series. When the weight vector is a perturbation of (1,...,1), these series converge and provide a basis for the (multivalued) holomorphic hypergeometric functions in a specific open subset of complex n-space. Our results are more explicit when the parameters are generic or when the solutions studied are logarithm-free. We also give an alternative proof of a result of Schulze and Walther that inhomogeneous A-hypergeometric systems have irregular singularities.
Dickenstein Alicia
Martínez Federico Nicolás
Matusevich Laura Felicia
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