Summation theorems for multidimensional basic hypergeometric series by determinant evaluations |
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Authors: | Michael Schlosser |
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Institution: | Institut für Mathematik der Universität Wien, Strudlhofgasse 4, A-1090 Wien, Austria |
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Abstract: | We derive summation formulas for a specific kind of multidimensional basic hypergeometric series associated to root systems of classical type. We proceed by combining the classical (one-dimensional) summation formulas with certain determinant evaluations. Our theorems include Ar extensions of Ramanujan's bilateral 1ψ1 sum, Cr extensions of Bailey's very-well-poised 6ψ6 summation, and a Cr extension of Jackson's very-well-poised 8φ7 summation formula. We also derive multidimensional extensions, associated to the classical root systems of type Ar, Br, Cr, and Dr, respectively, of Chu's bilateral transformation formula for basic hypergeometric series of Gasper–Karlsson–Minton type. Limiting cases of our various series identities include multidimensional generalizations of many of the most important summation theorems of the classical theory of basic hypergeometric series. |
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Keywords: | Basic hypergeometric Determinants Ar-series Cr-series Multidimensional summation theorems associate to root systems |
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