Published March 17, 2008
| Published
Journal Article
Open
On intervals in subgroup lattices of finite groups
- Creators
- Aschbacher, Michael
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.
Additional Information
© 2008 American Mathematical Society. Received by the editors June 28, 2006. Article electronically published on March 17, 2008. This work was partially supported by NSF-0504852. 20D30, 06B05, 46L37Attached Files
Published - ASCjams08.pdf
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Additional details
- Eprint ID
- 13447
- Resolver ID
- CaltechAUTHORS:ASCjams08
- 0504852
- NSF
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2009-05-13Created from EPrint's datestamp field
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2021-11-08Created from EPrint's last_modified field