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Communications in Algebra Volume 35, 2007 - Issue 7
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Original Articles

Markov and Artin Normal Form Theorem for Braid GroupsFootnote

L. A. Bokut Sobolev Institute of Mathematics, Novosibirsk, RussiaCorrespondence[email protected]
,
V. V. Chaynikov Faculty of Mathematics and Mechanics, Novosibirsk State University, Novosibirsk, Russia
&
K. P. Shum Faculty of Science, The Chinese University of Hong Kong, Hong Kong, China
Pages 2105-2115 | Received 25 Aug 2005, Published online: 11 Jun 2007

REFERENCES

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  • Bokut , L. A. , Shiao , L.-S . ( 2001 ). On Gröbner–Shirshov basis of Coxeter groups . Commun. in Algebra 29 ( 9 ): 4305 – 4319 .
  • Buchberger , B. ( 1965 ). An Algorithm for Finding a Basis for the Residue Class Ring of a Zero-Dimensional Polynomial Ideal. (German) . Ph.D. thesis , University of Insbruck , Austria .
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  • Markov , A. A. ( 1945 ). Foundations of the algebraic theory of Braids . In: Proceedings of the Steklov Mathematical Institute. 16. Moscow-Leningrad .
  • Newman , M. H. A. ( 1942 ). On theories with a combinatorial definition of “equivalence.” Ann. of Math. 43 : 223 – 243 .
  • Shirshov , A. I. ( 1962/1999 ). Some algorithm problems for Lie algebras (Russian) . Translation in ACM SIGSAM Bull. 33. Original Sibirsk. Mat. Z. 3 ( 2 ): 292 – 296 .
  • Communicated by A. I. Zelmanov.
  • ∗Dedicated to 80th birthday of Boris Isaakovich Plotkin.

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