Available in electronic format
Available in print format		 Journal of the American Mathematical Society
Journal of the American Mathematical Society
ISSN: 1088-6834(e) ISSN: 0894-0347(p)
Previous issue | Table of contents | Next issue
Articles in press | Recently posted articles | Most recent issue | All issues
Previous Article | Next Article
     

On intervals in subgroup lattices of finite groups

Author(s): Michael Aschbacher
Journal: J. Amer. Math. Soc. 21 (2008), 809-830.
MSC (2000): Primary 20D30; Secondary 06B05, 46L37
Posted: March 17, 2008
Retrieve article in: PDF

Abstract | References | Similar articles | Additional information

Abstract: We investigate the question of which finite lattices $ L$ are isomorphic to the lattice $ [H,G]$ of all overgroups of a subgroup $ H$ in a finite group $ G$. We show that the structure of $ G$ is highly restricted if $ [H,G]$ is disconnected. We define the notion of a ``signalizer lattice" in $ H$ and show for suitable disconnected lattices $ L$, if $ [H,G]$ is minimal subject to being isomorphic to $ L$ or its dual, then either $ G$ is almost simple or $ H$ admits a signalizer lattice isomorphic to $ L$ or its dual. We use this theory to answer a question in functional analysis raised by Watatani.

References:

[AS]
M. Aschbacher and L. Scott, Maximal subgroups of finite groups, J. Alg. 92 (1985), 44-80. MR 772471 (86m:20029)

[BL]
R. Baddeley and A. Lucchini, On Representing finite lattices as intervals in subgroup lattices of finite groups, J. Alg. 196 (1997), 1-100. MR 1474164 (98j:20022)

[FGT]
M. Aschbacher, Finite Group Theory, Cambridge Univ. Press, Cambridge, 1986. MR 895134 (89b:20001)

[GJ]
P. Grossman and V. Jones, Intermediate subfactors with no extra structure, J. Amer. Math. Soc. 20 (2007), 219-265. MR 2257402 (2007h:46077)

[Gl]
G. Glauberman, Central elements of core-free groups, J. Alg. 4 (1966), 403-420. MR 0202822 (34:2681)

[GLS3]
D. Gorenstein, R. Lyons, and R. Solomon, The Classification of the Finite Simple Groups, Number 3, Mathematical Surveys and Mongraphs, vol. 40, American Math. Soc., Providence, 1999. MR 1303592 (95m:20014)

[MN]
F. Murry and J. von Neumann, On rings of operators, Annals of Math. 37 (1936), 116-229. MR 1503275

[PP]
P. Palfy and P. Pudlak, Congruence lattices of finite algebras and intervals in subgroup lattices of finite groups, Algebra Universalis 11 (1980), 22-27. MR 593011 (82g:08003)

[T]
M. Takesaki, Theory of Operator Algebras I, Springer-Verlag, New York, 1979. MR 548728 (81e:46038)

[W]
Y. Watatani, Lattices of intermediate subfactors, J. Functional Analysis 140 (1996), 312-334. MR 1409040 (98c:46134)

Similar Articles:

Retrieve articles in Journal of the American Mathematical Society with MSC (2000): 20D30, 06B05, 46L37

Retrieve articles in all Journals with MSC (2000): 20D30, 06B05, 46L37

Additional Information:

Michael Aschbacher
Affiliation: Department of Mathematics, California Institute of Technology, Pasadena, California 91125

DOI: 10.1090/S0894-0347-08-00602-4
PII: S 0894-0347(08)00602-4
Received by editor(s): June 28, 2006
Posted: March 17, 2008
Additional Notes: This work was partially supported by NSF-0504852
Copyright of article: Copyright 2008, American Mathematical Society
The copyright for this article reverts to public domain after 28 years from publication.

  AMS Website Logo Small Comments: webmaster@ams.org
© Copyright 2009, American Mathematical Society
Privacy Statement 		Search the AMSPowered by Google