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Communications in Algebra Volume 37, 2009 - Issue 8
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Original Articles

A Comparison of Leibniz and Cyclic Homologies

Jerry M. Lodder Mathematical Sciences, New Mexico State University, Las Cruces, NM, USACorrespondence[email protected]
Pages 2557-2569 | Received 12 Sep 2007, Published online: 22 Jul 2009
 
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Abstract

We relate Leibniz homology to cyclic homology by studying a map from a long exact sequence in the Leibniz theory to the Connes' periodicity (ISB) exact sequence in the cyclic theory. We then show that the Godbillon–Vey invariant, as detected by the Leibniz homology of formal vector fields, maps to the Godbillon–Vey invariant as detected by the cyclic homology of the universal enveloping algebra of these vector fields. Additionally the Leibniz theory maps surjectively to string topology where the latter is expressed as cyclic homology.

2000 Mathematics Subject Classification:

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