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Galois groups of the Lie-irreducible generalized $q$-hypergeometric equations of order three with $q$-real parameters : an approach using a density theorem

Published 2007-11-22Version 1

In this paper we compute the difference Galois groups of the Lie-irreducible regular singular generalized q-hypergeometric equations of order 3 with q-real parameters by using a density theorem due to Sauloy. In contrast with the differential case, we show that these groups automatically contain the special linear group SL(3,C).

Categories: math.CA

Keywords: galois groups, density theorem, real parameters, regular singular generalized q-hypergeometric, singular generalized q-hypergeometric equations

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arXiv:0711.3513 [math.CA]Abstract References Reviews Resources

Galois groups of the Lie-irreducible generalized $q$-hypergeometric equations of order three with $q$-real parameters : an approach using a density theorem

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Galois groups of the Lie-irreducible generalized $q$-hypergeometric equations of order three with $q$-real parameters : an approach using a density theorem

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arXiv:0711.3513 [math.CA]Abstract References Reviews Resources