Cyclic homology
In mathematics, cyclic homology is an aspect of homological algebra. It was defined in 1983 by Allan Connes, as a sequence of groups written as
Related Topics:
Mathematics - Homological algebra - 1983 - Allan Connes
~ ~ ~ ~ ~ ~ ~ ~ ~ ~
:HCn(R).
~ ~ ~ ~ ~ ~ ~ ~ ~ ~
It may be generally defined as a certain general procedure to associate a cyclic sequence of abelian groups or modules to a given mathematical object (such as a topological space or a group).
Related Topics:
Sequence - Abelian group - Modules - Topological space - Group
~ ~ ~ ~ ~ ~ ~ ~ ~ ~
~ Table of Content ~
| ► | Introduction |
| ► | See also |
| ► | External links |
~ What's Hot ~
The Ugly Truth, Hannah Montana The Movie, Fantastic Mr Fox, My Sister S Keeper, The Mummy 4 Rise Of The Aztec, Dear John, New Moon, The Lovely Bones, Twilight, The Goods Live Hard Sell Hard, Cedar Boys, Sorority Row, The Time Traveler S Wife, Alvin And The Chipmunks The Squeakquel, The Boondock Saints Ii All Saints Day, Ninja Assassin, The Blind Side, Avatar, 500 Days Of Summer, The Princess And The Frog,
~ Community ~
| ► | History Forum Come and discuss about History, Civilizations, Historical Events and Figures |
| ► | History Web-Ring A community of sites, blogs and forums dedicated to History. Do not hesitate to submit your site. |
and are licensed under the GNU Free Documentation License.
Lexicon - Privacy Policy - Spiritus-Temporis.com ©2005.