Values of p-adic hypergeometric functions, and p-adic analogue of Kummer's linear identity

Abstract

Let p be an odd prime and Fp be the finite field with p elements. This paper focuses on the study of values of a generic family of hypergeometric functions in the p-adic setting which we denote by 3n-1G3n-1(p, t), where n≥1 and t∈Fp. These values are expressed in terms of numbers of zeros of certain polynomials over Fp. These results lead to certain p-adic analogues of classical hypergeometric identities. Namely, we obtain p-adic analogues of particular cases of a Gauss' theorem and a Kummer's theorem. Moreover, we examine the zeros of these functions. For instance, if n is odd then we obtain zeros of 3n-1G3n-1(p, t)=0 under certain condition on t. In contrast we show that if n is even then the function 3n-1G3n-1(p, t) has no non-trivial zeros for any prime p.