The Tits--Kantor--Koecher construction for Jordan dialgebras

V. Yu. Gubarev; P. S. Kolesnikov

arXiv:0907.1740·math.RA·August 1, 2011·1 cites

The Tits--Kantor--Koecher construction for Jordan dialgebras

V. Yu. Gubarev, P. S. Kolesnikov

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TL;DR

This paper extends the Tits--Kantor--Koecher construction to Jordan dialgebras, establishing an embedding into Leibniz algebras, thus generalizing classical algebraic structures to a noncommutative setting.

Contribution

It introduces a novel Tits--Kantor--Koecher construction for Jordan dialgebras, linking them to Leibniz algebras in a new way.

Findings

01

Established an embedding of Jordan dialgebras into Leibniz algebras.

02

Provided identities characterizing Jordan dialgebras.

03

Extended classical algebraic constructions to noncommutative generalizations.

Abstract

We study a noncommutative generalization of Jordan algebras called Jordan dialgebras. These are algebras that satisfy the identities $[x_{1} x_{2}] x_{3} = 0$ , $(x_{1}^{2}, x_{2}, x_{3}) = 2 (x_{1}, x_{2}, x_{1} x_{3})$ , $x_{1} (x_{1}^{2} x_{2}) = x_{1}^{2} (x_{1} x_{2})$ ; they are related with Jordan algebras in the same way as Leibniz algebras are related to Lie algebras. We present an analogue of the Tits---Kantor---Koecher construction for Jordan dialgebras that provides an embedding of such an algebra into Leibniz algebra.

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Taxonomy

TopicsAlgebraic structures and combinatorial models · Advanced Topics in Algebra · Homotopy and Cohomology in Algebraic Topology