On the capability of groups

Graham Ellis

doi:10.1017/S0013091500019842

Abstract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

We show how the third integral homology of a group plays a role in determining whether a given group is isomorphic to an inner automorphism group. Various necessary conditions, and sufficient conditions, for the existence of such an isomorphism are obtained.

References

REFERENCES

1. Baer, R., Groups with preassigned central and central quotient group, Trans. Amer. Math. Soc. 44(1938), 387–412.CrossRef Google Scholar

2. Beyl, F. R., Felgner, U. and Schmid, P., On groups occurring as center factor groups, J. Algebra 61 (1979), 161–177.CrossRef Google Scholar

3. Beyl, F. R. and Tappe, J., Groups extensions, representations, and the Schur multiplicator (Lecture Notes in Math. 958, Springer, 1982).CrossRef Google Scholar

4. Brown, R., Johnson, D. L. and Robertson, E. F., Some computations of nonabelian tensor products of groups, J Algebra 111 (1987), 177–202.CrossRef Google Scholar

5. Brown, R. and Loday, J.-L., Van Kampen theorems for diagrams of spaces, Topology 26 (1987), 311–335.CrossRef Google Scholar

6. Chiswell, I. M., Collins, D. J. and Huebschmann, J., Aspherical group presentations, Math. Z. 178 (1981), 1–36.CrossRef Google Scholar

7. Ellis, G., Nonabelian exterior products of groups and an exact sequence in the homology of groups, Glasgow Math. J. 29 (1987), 13–19.CrossRef Google Scholar

8. Ellis, G., On five well-known commutator identities, J. Austral. Math. Soc. Ser. A 54 (1993), 1–19.CrossRef Google Scholar

9. Ellis, G., Tensor products and q-crossed modules, J. London Math. Soc. (2) 51 (1995), 243–258.CrossRef Google Scholar

10. Hall, M. and Senior, J. K., The groups of order 2ⁿ(n ≤ 6) (MacMillan, 1964).Google Scholar

11. Hall, P., The classification of prime-power groups, J. Reine Angew. Math. 182 (1940), 130–141.CrossRef Google Scholar

12. Hilton, P. J. and Stammbach, U., A Course in Homological Algebra, (Graduate Texts in Math. 4, Springer, New York, 1971).CrossRef Google Scholar

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Beidleman, J.C. Heineken, H. and Newell, M. 2004. Centre and norm. Bulletin of the Australian Mathematical Society, Vol. 69, Issue. 3, p. 457.

Magidin, Arturo 2006. Capable 2-Generator 2-Groups of Class Two. Communications in Algebra, Vol. 34, Issue. 6, p. 2183.

Eick, Bettina and Nickel, Werner 2008. Computing the Schur multiplicator and the nonabelian tensor square of a polycyclic group. Journal of Algebra, Vol. 320, Issue. 2, p. 927.

Blyth, Russell D. and Morse, Robert Fitzgerald 2009. Computing the nonabelian tensor squares of polycyclic groups. Journal of Algebra, Vol. 321, Issue. 8, p. 2139.

MAGIDIN, ARTURO 2009. EMBEDDING GROUPS OF CLASS TWO AND PRIME EXPONENT IN CAPABLE AND NONCAPABLE GROUPS. Bulletin of the Australian Mathematical Society, Vol. 79, Issue. 2, p. 303.

Blyth, Russell D. Fumagalli, Francesco and Morigi, Marta 2010. Some structural results on the non-abelian tensor square of groups. Journal of Group Theory, Vol. 13, Issue. 1,

Rashid, S. Sarmin, N. H. Erfanian, A. and Mohd Ali, N. M. 2011. On the nonabelian tensor square and capability of groups of order p 2 q. Archiv der Mathematik, Vol. 97, Issue. 4, p. 299.

Bekka, Bachir and de la Harpe, Pierre 2011. Groups with faithful irreducible projective unitary representations. Forum Mathematicum, p. -.

KAPPE, LUISE-CHARLOTTE MOHD ALI, NOR MUHAINIAH and SARMIN, NOR HANIZA 2011. ON THE CAPABILITY OF FINITELY GENERATED NON-TORSION GROUPS OF NILPOTENCY CLASS 2. Glasgow Mathematical Journal, Vol. 53, Issue. 2, p. 411.

Parvizi, Mohsen and Niroomand, Peyman 2012. On the structure of groups whose exterior or tensor square is a p-group. Journal of Algebra, Vol. 352, Issue. 1, p. 347.

Rashid, S. Sarmin, N.H. Erfanian, A. Mohd Ali, N.M. and Zainal, R. 2013. On the nonabelian tensor square and capability of groups of order8q. Indagationes Mathematicae, Vol. 24, Issue. 3, p. 581.

Jafari, S. Hadi 2016. Categorizing finite p-groups by the order of their non-abelian tensor squares. Journal of Algebra and Its Applications, Vol. 15, Issue. 05, p. 1650095.

Leppälä, Emma and Niemenmaa, Markku 2016. On Finite Nonabelian Loop Capable Groups. Communications in Algebra, Vol. 44, Issue. 4, p. 1569.

Aslizadeh, Arezoo Reza Salemkar, Ali and Riyahi, Zahra 2019. Polynilpotent capability of Lie algebras. Communications in Algebra, Vol. 47, Issue. 4, p. 1390.

Seifi, Monireh and Hadi Jafari, S. 2019. On the capability of finitep-groups with derived subgroup of orderp. Communications in Algebra, Vol. 47, Issue. 7, p. 2920.

Monfared, Forough Gharibi Kayvanfar, Saeed and Johari, Farangis 2021. On the q-capability of groups. Asian-European Journal of Mathematics, Vol. 14, Issue. 05, p. 2150071.

Khmaladze, Emzar Kurdiani, Revaz and Ladra, Manuel 2021. On the capability of Leibniz algebras. Georgian Mathematical Journal, Vol. 28, Issue. 2, p. 271.

Johari, Farangis 2022. Bounds for the dimension of the center factor in capable nilpotent Lie algebras of class two. Linear and Multilinear Algebra, Vol. 70, Issue. 21, p. 6412.

Kalteh, O. and Jafari, S. Hadi 2022. Capable groups of order p3q. Algebra and Discrete Mathematics, Vol. 33, Issue. 1, p. 104.

Eghbali Kalhor, Gelareh Edalatzadeh, Behrouz and Salemkar, Ali Reza 2023. Extra-special Leibniz superalgebras. Forum Mathematicum, Vol. 35, Issue. 5, p. 1199.

Download full list

Article contents

On the capability of groups

Abstract

References

REFERENCES

Save article to Kindle

Save article to Dropbox

Save article to Google Drive

Reply to: Submit a response

Your details

You have entered the maximum number of contributors

Conflicting interests