论文信息 - A New Algorithm for Solving the Word Problem in Braid Groups

A New Algorithm for Solving the Word Problem in Braid Groups

Abstract One of the most interesting questions about a group is whether its word problem can be solved and how. The word problem in the braid group is of particular interest to topologists, algebraists, and geometers, and is the target of intensive current research. We look at the braid group from a topological point of view (rather than a geometric one). The braid group is defined by the action of diffeomorphisms on the fundamental group of a punctured disk. We exploit the topological definition in order to give a new approach for solving its word problem. Our algorithm, although not better in complexity, is faster in comparison with known algorithms for short braid words, and it is almost independent of the number of strings in the braids. Moreover, the algorithm is based on a new computer presentation of the elements of the fundamental group of a punctured disk. This presentation can be used also for other algorithms.

David Garber | Mina Teicher | Shmuel Kaplan

[1] Phillip A. Griffiths,et al. Complex analysis and algebraic geometry , 1979 .

[3] Alain Jacquemard,et al. About the effective classification of conjugacy classes of braids , 1990 .

[4] F. A. Garside,et al. THE BRAID GROUP AND OTHER GROUPS , 1969 .

[5] Joan S. Birman,et al. A new approach to the word and conjugacy problems in the braid groups , 1997 .

[6] Patrick Dehornoy,et al. A Fast Method for Comparing Braids , 1997 .

[7] Patrick Dehornoy. FROM LARGE CARDINALS TO BRAIDS VIA DISTRIBUTIVE ALGEBRA , 1995 .

[8] E. Artin. The theory of braids. , 1950, American scientist.

[9] Ki Hyoung Ko,et al. Band-generator presentation for the 4-braid group , 1997 .

[10] Patrick Dehornoy,et al. Braid groups and left distributive operations , 1994 .

[11] Hugh R. Morton,et al. ALGORITHMS FOR POSITIVE BRAIDS , 1994 .