Gosper Summability of Rational Multiples of Hypergeometric Terms

Abstract

By telescoping method, Sun gave some hypergeometric series whose sums are related to π recently. We investigate these series from the point of view of Gosper's algorithm. Given a hypergeometric term tk, we consider the Gosper summability of r(k)tk for r(k) being a rational function of k. We give an upper bound and a lower bound on the degree of the numerator of r(k) such that r(k)tk is Gosper summable. We also show that the denominator of the r(k) can read from the Gosper representation of tk+1/tk. Based on these results, we give a systematic method to construct series whose sums can be derived from the known ones. We also illustrated the corresponding super-congruences and the q-analogue of the approach.