Hypergeometric Functions in Exact Geometric Computation

The hypergeometric function of a real variable is computed for arbitrary real parameters. The transformation theory of the hypergeometric function is used to obtain rapidly convergent power series. The divergences that occur in the individual terms of the transformation for integer parameters are re

We present a generic C++ design to perform exact geometric computations efficiently using lazy evaluations. Exact geometric computations are critical for the robustness of geometric algorithms. Their efficiency is also important for many applications, hence the need for delaying the costly exact com

This paper describes three algorithms for q-hypergeometric summation: • a multibasic analogue of Gosper's algorithm, • the q-Zeilberger algorithm, and • an algorithm for finding q-hypergeometric solutions of linear recurrences together with their Maple implementations, which is relevant both to pe