Homology of braid groups and their generalizations

Vladimir Vershinin

Banach Center Publications (1998)

  • Volume: 42, Issue: 1, page 421-446
  • ISSN: 0137-6934

Abstract

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In the paper we give a survey of (co)homologies of braid groups and groups connected with them. Among these groups are pure braid groups and generalized braid groups. We present explicit formulations of some theorems of V. I. Arnold, E. Brieskorn, D. B. Fuks, F. Cohen, V. V. Goryunov and others. The ideas of some proofs are outlined. As an application of (co)homologies of braid groups we study the Thom spectra of these groups.

How to cite

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Vershinin, Vladimir. "Homology of braid groups and their generalizations." Banach Center Publications 42.1 (1998): 421-446. <http://eudml.org/doc/208821>.

@article{Vershinin1998,
abstract = {In the paper we give a survey of (co)homologies of braid groups and groups connected with them. Among these groups are pure braid groups and generalized braid groups. We present explicit formulations of some theorems of V. I. Arnold, E. Brieskorn, D. B. Fuks, F. Cohen, V. V. Goryunov and others. The ideas of some proofs are outlined. As an application of (co)homologies of braid groups we study the Thom spectra of these groups.},
author = {Vershinin, Vladimir},
journal = {Banach Center Publications},
keywords = {generalized braid group; configuration space; homology; Eilenberg-MacLane spectrum; Braid group; Coxeter group; Thom spectrum; homologies of braid groups; pure braid groups; generalized braid groups; Thom spectra},
language = {eng},
number = {1},
pages = {421-446},
title = {Homology of braid groups and their generalizations},
url = {http://eudml.org/doc/208821},
volume = {42},
year = {1998},
}

TY - JOUR
AU - Vershinin, Vladimir
TI - Homology of braid groups and their generalizations
JO - Banach Center Publications
PY - 1998
VL - 42
IS - 1
SP - 421
EP - 446
AB - In the paper we give a survey of (co)homologies of braid groups and groups connected with them. Among these groups are pure braid groups and generalized braid groups. We present explicit formulations of some theorems of V. I. Arnold, E. Brieskorn, D. B. Fuks, F. Cohen, V. V. Goryunov and others. The ideas of some proofs are outlined. As an application of (co)homologies of braid groups we study the Thom spectra of these groups.
LA - eng
KW - generalized braid group; configuration space; homology; Eilenberg-MacLane spectrum; Braid group; Coxeter group; Thom spectrum; homologies of braid groups; pure braid groups; generalized braid groups; Thom spectra
UR - http://eudml.org/doc/208821
ER -

References

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