Restricted subgroups of wreath products of groups

C. H. Houghton

Compositio Mathematica (1976)

  • Volume: 33, Issue: 2, page 209-225
  • ISSN: 0010-437X

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Houghton, C. H.. "Restricted subgroups of wreath products of groups." Compositio Mathematica 33.2 (1976): 209-225. <http://eudml.org/doc/89307>.

@article{Houghton1976,
author = {Houghton, C. H.},
journal = {Compositio Mathematica},
language = {eng},
number = {2},
pages = {209-225},
publisher = {Noordhoff International Publishing},
title = {Restricted subgroups of wreath products of groups},
url = {http://eudml.org/doc/89307},
volume = {33},
year = {1976},
}

TY - JOUR
AU - Houghton, C. H.
TI - Restricted subgroups of wreath products of groups
JO - Compositio Mathematica
PY - 1976
PB - Noordhoff International Publishing
VL - 33
IS - 2
SP - 209
EP - 225
LA - eng
UR - http://eudml.org/doc/89307
ER -

References

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  1. [1] R. Bieri: Normal subgroups in duality groups and in groups of cohomological dimension 2. J. Pure and Applied Algebra7 (1976) 35-51. Zbl0322.20024MR390078
  2. [2] D.E. Cohen: Groups of cohomological dimension one. Lecture Notes in Mathema- tics245. (Springer-Verlag, Berlin, 1972). Zbl0231.20018MR344359
  3. [3] F.T. Farrell: The second cohomology group of G with Z2G coefficients. Topology13 (1974) 313-326. Zbl0322.55007MR360864
  4. [4] F.T. Farrell: Poincaré duality and groups of type (FP). Comm. Math. Helv.50 (1975) 187-195. Zbl0314.18006MR382479
  5. [5] B. Hartley: Complements, baseless subgroups and Sylow subgroups of infinite wreath products. Compositio Mathematica26 (1973) 3-30. Zbl0253.20057MR316580
  6. [6] P.J. Higgins: Notes on categories and groupoids. Van Nostrand Reinhold, London, 1971. Zbl0226.20054MR327946
  7. [7] C.H. Houghton: Ends of groups and the associated first cohomology groups. J. London Math. Soc.6 (1972) 81-92. Zbl0249.20016MR316595
  8. [8] C.H. Houghton: Ends of groups and baseless subgroups of wreath products. Compositio Mathematica27 (1973) 205-211. Zbl0273.20032MR330303
  9. [9] C.H. Houghton and D. Segal: Some sufficient conditions for groups to have one end. J. London Math. Soc.10 (1975) 89-96. Zbl0302.20030MR369542

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