Yasushi Kajihara
Published 2013-10-27, updated 2014-03-19Version 2
Structures of symmetries of transformations for Holman-Biedenharn-Louck $A_n$ hypergeometric series: $A_n$ terminating balanced ${}_4 F_3$ series and $A_n$ elliptic ${}_{10} E_9$ series are discussed. Namely the description of the invariance groups and the classification all of possible transformations for each types of $A_n$ hypergeometric series are given. Among them, a "periodic" affine Coxeter group which seems to be new in the literature arises as an invariance group for a class of $A_n$ ${}_4 F_3$ series.
Journal: SIGMA 10 (2014), 026, 29 pages
An invariance group for a linear combination of two Saalschützian ${}_4F_3(1)$ hypergeometric series
Relations for a class of terminating ${}_4F_3(4)$ hypergeometric series
On a new identity for the H-function with applications to the summation of hypergeometric series
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