Computational and experimental group theory : AMS-ASL Joint Special Session, Interactions Between Logic, Group Theory and Computer Science, January 15-16, 2003, Baltimore, Maryland
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Bibliographic Information
Computational and experimental group theory : AMS-ASL Joint Special Session, Interactions Between Logic, Group Theory and Computer Science, January 15-16, 2003, Baltimore, Maryland
(Contemporary mathematics, 349)
American Mathematical Society, c2004
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Experimental group theory
Available at / 39 libraries
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Hokkaido University, Library, Graduate School of Science, Faculty of Science and School of Science図書
DC22:512.21/B6452080002162
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Includes bibliographical references
Description and Table of Contents
Description
Since its origin in the early 20th century, combinatorial group theory has been primarily concerned with algorithms for solving particular problems on groups given by generators and relations: word problems, conjugacy problems, isomorphism problems, etc. Recent years have seen the focus of algorithmic group theory shift from the decidability/undecidability type of result to the complexity of algorithms. Papers in this volume reflect that paradigm shift. Articles are based on the AMS/ASL Joint Special Session, Interactions Between Logic, Group Theory and Computer Science. The volume is suitable for graduate students and research mathematicians interested in computational problems of group theory.
Table of Contents
Quantum algorithms in group theory by M. Batty, S. L. Braunstein, A. J. Duncan, and S. Rees Genetic algorithms and equations in free groups and semigroups by R. F. Booth, D. Y. Bormotov, and A. V. Borovik One variable equations in free groups via context free languages by R. H. Gilman and A. G. Myasnikov Whitehead method and genetic algorithms by A. D. Miasnikov and A. G. Myasnikov The structure of automorphic conjugacy in the free group of rank two by B. Khan Pattern recognition approaches to solving combinatorial problems in free groups by R. M. Haralick, A. D. Miasnikov, and A. G. Myasnikov Experimenting with primitive elements in $F_2$ by D. Y. Bormotov.
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