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Gröbner-shirsh
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Item specifics
- Condition
- Brand New: A new, unread, unused book in perfect condition with no missing or damaged pages. See all condition definitionsopens in a new window or tab
- Book Title
- Gröbner-shirshov Bases : Normal Forms, Combinatorial and Decision
- ISBN
- 9789814619486
- Publication Year
- 2017
- Type
- Textbook
- Format
- Hardcover
- Language
- English
- Subject Area
- Mathematics
- Publication Name
- Grobner-Shirshov Bases : Normal Forms, Combinatorial and Decision Problems in Algebra
- Publisher
- World Industries Scientific Publishing Co Pte LTD
- Subject
- Algebra / General, Combinatorics, Geometry / Algebraic
- Item Weight
- 0 Oz
- Number of Pages
- 450 Pages
About this product
Product Identifiers
Publisher
World Industries Scientific Publishing Co Pte LTD
ISBN-10
9814619485
ISBN-13
9789814619486
eBay Product ID (ePID)
236978111
Product Key Features
Number of Pages
450 Pages
Publication Name
Grobner-Shirshov Bases : Normal Forms, Combinatorial and Decision Problems in Algebra
Language
English
Subject
Algebra / General, Combinatorics, Geometry / Algebraic
Publication Year
2017
Type
Textbook
Subject Area
Mathematics
Format
Hardcover
Dimensions
Item Weight
0 Oz
Additional Product Features
Intended Audience
Trade
LCCN
2018-000569
Synopsis
The book is about (associative, Lie and other) algebras, groups, semigroups presented by generators and defining relations. They play a great role in modern mathematics. It is enough to mention the quantum groups and Hopf algebra theory, the Kac-Moody and Borcherds algebra theory, the braid groups and Hecke algebra theory, the Coxeter groups and semisimple Lie algebra theory, the plactic monoid theory. One of the main problems for such presentations is the problem of normal forms of their elements. Classical examples of such normal forms give the Poincaré-Birkhoff-Witt theorem for universal enveloping algebras and Artin-Markov normal form theorem for braid groups in Burau generators.What is now called Gröbner-Shirshov bases theory is a general approach to the problem. It was created by a Russian mathematician A I Shirshov (1921-1981) for Lie algebras (explicitly) and associative algebras (implicitly) in 1962. A few years later, H Hironaka created a theory of standard bases for topological commutative algebra and B Buchberger initiated this kind of theory for commutative algebras, the Gröbner basis theory. The Shirshov paper was largely unknown outside Russia. The book covers this gap in the modern mathematical literature. Now Gröbner-Shirshov bases method has many applications both for classical algebraic structures (associative, Lie algebra, groups, semigroups) and new structures (dialgebra, pre-Lie algebra, Rota-Baxter algebra, operads). This is a general and powerful method in algebra., The book is about (associative, Lie and other) algebras, groups, semigroups presented by generators and defining relations. They play a great role in modern mathematics. It is enough to mention the quantum groups and Hopf algebra theory, the Kac-Moody and Borcherds algebra theory, the braid groups and Hecke algebra theory, the Coxeter groups and semisimple Lie algebra theory, the plactic monoid theory. One of the main problems for such presentations is the problem of normal forms of their elements. Classical examples of such normal forms give the Poincar -Birkhoff-Witt theorem for universal enveloping algebras and Artin-Markov normal form theorem for braid groups in Burau generators.What is now called Gr bner-Shirshov bases theory is a general approach to the problem. It was created by a Russian mathematician A I Shirshov (1921-1981) for Lie algebras (explicitly) and associative algebras (implicitly) in 1962. A few years later, H Hironaka created a theory of standard bases for topological commutative algebra and B Buchberger initiated this kind of theory for commutative algebras, the Gr bner basis theory. The Shirshov paper was largely unknown outside Russia. The book covers this gap in the modern mathematical literature. Now Gr bner-Shirshov bases method has many applications both for classical algebraic structures (associative, Lie algebra, groups, semigroups) and new structures (dialgebra, pre-Lie algebra, Rota-Baxter algebra, operads). This is a general and powerful method in algebra.
LC Classification Number
QA251.3G77 2018
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