Graded simple Jordan superalgebras of growth one
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Bibliographic Information
Graded simple Jordan superalgebras of growth one
(Memoirs of the American Mathematical Society, no. 711)
American Mathematical Society, 2001
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Note
"Volume 150, number 711 (second of 5 numbers)"
Includes bibliographical references (p. 139-140)
Description and Table of Contents
Description
We classify graded simple Jordan superalgebras of growth one which correspond the so called 'superconformal algebras' via the Tits-Kantor-Koecher construction. The superconformal algebras with a 'hidden' Jordan structure are those of type $K$ and the recently discovered Cheng-Kac superalgebras $CK(6)$. We show that Jordan superalgebras related to the type $K$ are Kantor Doubles of some Jordan brackets on associative commutative superalgebras and list these brackets.
Table of Contents
Introduction Structure of the even part Cartan type Even part is direct sum of two loop algebras $A$ is a loop algebra $J$ is a finite dimensional Jordan superalgebra or a Jordan superalgebra of a superform The main case Impossible cases Bibliography.
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