Relations among complementary and supplementary pairings of Saalschutzian 4F3(1) series

Abstract

We investigate sums K(x) and L(x) of pairs of (suitably normalized) Saalsch\"utzian 4F3(1) hypergeometric series, and develop a theory of relations among these K and L functions. The function L(x) has been studied extensively in the literature, and has been shown to satisfy a number of two-term and three-term relations with respect to the variable x. More recent works have framed these relations in terms of Coxeter group actions on x, and have developed a similar theory of two-term and three-term relations for K(x). In this article, we derive "mixed" three-term relations, wherein any one of the L (respectively, K) functions arising in the above context may be expressed as a linear combination of two of the above K (respectively, L) functions. We show that, under the appropriate Coxeter group action, the resulting set of three-term relations (mixed and otherwise) among K and L functions partitions into eighteen orbits. We provide an explicit example of a relation from each orbit. We further classify the eighteen orbits into five types, with each type uniquely determined by the distances (under a certain natural metric) between the K and L functions in the relation. We show that the type of a relation dictates the complexity (in terms of both number of summands and number of factors in each summand) of the coefficients of the K and L functions therein.