Log in to see this item in other languages
Involutions and semiinvolutions
We define a linear map called a semiinvolution as a generalization of an involution, and show that any nilpotent linear endomorphism is a product of an involution and a semiinvolution. We also give a new proof for Djocović’s theorem on a product of two involutions.
Creator
- Ishibashi, Hiroyuki
Subject
- classical groups
- vector spaces and linear maps
- involutions
- factorization of a linear map into a product of simple
Type of item
- model:article
Creator
- Ishibashi, Hiroyuki
Subject
- classical groups
- vector spaces and linear maps
- involutions
- factorization of a linear map into a product of simple
Type of item
- model:article
Providing institution
Aggregator
Rights statement for the media in this item (unless otherwise specified)
- http://creativecommons.org/publicdomain/mark/1.0/
Rights
- policy:public
Place-Time
- 533-541
Source
- Czechoslovak Mathematical Journal | 2006 Volume:56 | Number:2
Identifier
- uuid:1ec0e390-c7ea-4107-932d-99a0217dd298
- https://cdk.lib.cas.cz/client/handle/uuid:1ec0e390-c7ea-4107-932d-99a0217dd298
- uuid:1ec0e390-c7ea-4107-932d-99a0217dd298
Format
- bez média
- svazek
Language
- eng
- eng
Providing country
- Czech Republic
Collection name
First time published on Europeana
- 2021-06-01T12:19:28.026Z
Last time updated from providing institution
- 2021-06-01T12:19:28.026Z