Three Recitations on Holonomic Systems and Hypergeometric Series

Doron Zeilberger (Temple University)

arXiv:math/9403215·math.CO·February 3, 2008·J. Symb. Comput.·5 cites

Three Recitations on Holonomic Systems and Hypergeometric Series

Doron Zeilberger (Temple University)

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TL;DR

This paper provides a tutorial on the foundational WZ theory and Gosper algorithm, explaining their significance in the study of holonomic systems and hypergeometric series.

Contribution

It offers an accessible introduction to WZ theory and Gosper algorithm, highlighting their roles in analyzing holonomic systems and hypergeometric series.

Findings

01

Clarifies the connection between WZ theory and hypergeometric series

02

Provides insights into the Gosper algorithm's applications

03

Serves as an educational resource for these mathematical tools

Abstract

A tutorial on what later became to be known as WZ theory, as well as a motivated account of the seminal Gosper algorithm.

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Taxonomy

TopicsAdvanced Algebra and Geometry · Algebraic Geometry and Number Theory · Advanced Mathematical Identities