| Algorithmic Algebraic Combinatorics and Gröbner Bases 2009 Edition Contributor(s): Klin, Mikhail (Editor), Jones, Gareth A. (Editor), Jurisic, Aleksandar (Editor) |
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ISBN: 3642424384 ISBN-13: 9783642424380 Publisher: Springer OUR PRICE: $189.99 Product Type: Paperback - Other Formats Published: November 2014 |
| Additional Information |
| BISAC Categories: - Mathematics | Combinatorics - Mathematics | Discrete Mathematics - Mathematics | Algebra - General |
| Dewey: 004 |
| Physical Information: 0.68" H x 6.14" W x 9.21" (1.00 lbs) 311 pages |
| Descriptions, Reviews, Etc. |
| Publisher Description: In 2006 a special semester on Gr] obner bases and related methods was or- nized by RICAM and RISC, directed by Bruno Buchberger and Heinz Engl. The main focus of the semester were the development of the formal theory of Gr] obner bases (brie?y GB), the e?cient implementation of all algorithms related to this theory, and the promotion of recent and new applications of GB. The workshop D1 Gr] obner bases in cryptography, coding theory and - gebraic combinatorics, Linz, May 1 6, 2006 (chairmen M. Klin, L. Perret, M. Sala) was one of the main ingredients of the semester. The last two days of this workshop, devoted to combinatorics, made it possible to bring together experts in algorithmic problems related to coherent con?gurations and as- ciation schemes with a community of people working in the area of GB. Each side was interested in understanding the computational problems and current algorithmicpossibilitiesoftheother, withaparticularobjectiveofintroducing the practical use of GB in algebraic combinatorics. Materials (mainly slides of lectures and posters) available from the site http: //www.ricam.oeaw.ac.at/specsem/srs/groeb/schedule D1.htmlprovidea helpful and vivid picture of the successful exchange of scienti?c information during the workshop D1. Asafollow-uptothespecialsemester,10volumesofproceedingsarebeing published by di?erent publishers. The current collection of papers re?ects diverse investigations in the area of algebraic combinatorics (with or without explicit use of GB), but with a de?nite emphasis on algorithmic approaches." |