A Streamlined Difference Ring Theory: Indefinite Nested Sums, the Alternating Sign, and the Parameterized Telescoping Problem

Author

Schneider, Carsten

Author_Institution

Res. Inst. for Symbolic Comput. (RISC), Johannes Kepler Univ. (JKU), Linz, Austria

fYear

2014

fDate

22-25 Sept. 2014

Firstpage

26

Lastpage

33

Abstract

We present an algebraic framework to represent indefinite nested sums over hyper geometric expressions in difference rings. In order to accomplish this task, parts of Karr´s difference field theory have been extended to a ring theory in which also the alternating sign can be expressed. The underlying machinery relies on algorithms that compute all solutions of a given parameterized telescoping equation. As a consequence, we can solve the telescoping and creative telescoping problem in such difference rings.

Keywords

algebra; Karr difference field theory; creative telescoping problem; hypergeometric expression; indefinite nested sum; parameterized telescoping equation; parameterized telescoping problem; streamlined difference ring theory; Educational institutions; Machinery; Poles and towers; Polynomials; Reduced instruction set computing; Scientific computing; creative telescoping; d´Alembertian expressions; roots of unity; symbolic summation; telescoping;

fLanguage

English

Publisher

ieee

Conference_Titel

Symbolic and Numeric Algorithms for Scientific Computing (SYNASC), 2014 16th International Symposium on

Conference_Location

Timisoara

Print_ISBN

978-1-4799-8447-3

Type

conf

DOI

10.1109/SYNASC.2014.12

Filename

7034662