Hypergeometric functions and algebraic curves ye=xd+ax+b

Abstract

Let q be a prime power and Fq be a finite field with q elements. Let e and d be positive integers. In this paper, for d≥2 and q1(mod~ed(d-1)), we calculate the number of points on an algebraic curve Ee,d:ye=xd+ax+b over a finite field Fq in terms of dFd-1 Gaussian hypergeometric series with multiplicative characters of orders d and e(d-1), and in terms of d-1Fd-2 Gaussian hypergeometric series with multiplicative characters of orders ed(d-1) and e(d-1). This helps us to express the trace of Frobenius endomorphism of an algebraic curve Ee,d over a finite field Fq in terms of the above hypergeometric series. As applications, we obtain some transformations and special values of 2F1 Gaussian hypergeometric series.