Title of article
Dimensions of solution spaces of H-systems
Author/Authors
S.A. Abramov، نويسنده , , M. PetkovSek، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2008
Pages
18
From page
377
To page
394
Abstract
An H-system is a system of first-order linear homogeneous recurrence equations for a single unknown function T, with coefficients which are polynomials with complex coefficients. We consider solutions of -systems which are of the form where either , or and S is the set of integer singularities of the system. It is shown that any natural number is the dimension of the solution space of some consistent -system, and that in the case d≥2 there are -systems whose solution space is infinite dimensional. The relationship between dimensions of solution spaces in the two cases and is investigated. We prove that every consistent -system has a non-zero solution Twith . Finally we give an appropriate corollary to the Ore–Sato theorem on possible forms of solutions of -systems in this setting.
Keywords
Existence of non-zero solutions , Dimensions of solution spaces , Ore–Sato theorem , Hypergeometric systems
Journal title
Journal of Symbolic Computation
Serial Year
2008
Journal title
Journal of Symbolic Computation
Record number
806058
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