A Systematic Study of Groebner Basis Methods
Abstract
This habilitation (German variant of a PhD on top of a PhD) thesis presents the quintessence of the ideas and experiences with Groebner Bases of Birgit Reinert. She died unexpectedly without providing an abstract. As arXiv requires an abstract, let us quote from the table of contents: History of Groebner Bases. The two definitions of Groebner Bases. Generalizations. Groebner Bases in Function Rings -- A Guide for Introducing Relations to Algebraic Structures. Applications of Groebner Bases to Function Rings. Groebner Bases in Polynomial Rings. Reduction Rings. Quotients of Reduction Rings. Sums of Reduction Rings. Modules over Reduction Rings. Polynomial Rings over Reduction Rings. Function Rings: Right Ideals and Right Standard Representations. Function Rings over Fields. Function Rings over Reduction Rings. Function Rings over the Integers. Right F-Modules. Ideals and Standard Representations. Two-sided Modules. Applications of Groebner Bases: Natural Applications. Quotient Rings. Elimination Theory. Polynomial Mappings. Systems of One-sided Equations in Function Rings over the Integers.
Keywords
Cite
@article{arxiv.0903.2462,
title = {A Systematic Study of Groebner Basis Methods},
author = {Birgit Reinert},
journal= {arXiv preprint arXiv:0903.2462},
year = {2009}
}
Comments
xviii + 200 pages. Author is deceased