Title :
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
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;
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
DOI :
10.1109/SYNASC.2014.12
