Implementation of Gosper-Karr's symbolic summation algorithm

The rational functions form the most elementary class of functions for which the problem of summation or antidifferencing is not straightforward. Gosper's algorithm finds the antidifference of a rational function only if that antidifference is itself a rational function. We present an algorithm base

A detailed study of the degree setting for Gosper's algorithm for indefinite hypergeometric summation is presented. In particular, we discriminate between rational and proper hypergeometric input. As a result, the critical degree bound can be improved in the former case.