$(\epsilon,\delta)$-Freudenthal Kantor triple systems, $\delta$-structurable algebras and Lie superalgebras

Kamiya, Noriaki; Mondoc, Daniel; Okubo, Susumu

$(\epsilon,\delta)$-Freudenthal Kantor triple systems, $\delta$-structurable algebras and Lie superalgebras

Mark

Kamiya, Noriaki ; Mondoc, Daniel ^LU and Okubo, Susumu (2010) In Algebras, Groups and Geometries 2(27). p.191-206

Abstract: In this paper we discuss $(\epsilon,\delta)$-Freudenthal Kantor triple systems

with certain structure on the subspace $L_{-2}$ of the corresponding standard

embedding five graded Lie (super)algebra $L(\epsilon,\delta):=L_{-2}\oplus L_{-1}\oplus L_0\oplus L_1\oplus L_2; [L_i,L_j]\subseteq L_{i+j}$. We recall Lie and Jordan structures associated with $(\epsilon,\delta)$-Freudenthal Kantor triple systems (see ref [26],[27]) and we give results for unitary and pseudo-unitary $(\epsilon,\delta)$-Freudenthal Kantor triple systems. Further, we give the notion of $\delta$-structurable algebras and connect them to $(-1,\delta)$-Freudenthal Kantor triple systems and the corresponding Lie (super)

algebra construction.

Please use this url to cite or link to this publication: https://lup.lub.lu.se/record/1857155

author

Kamiya, Noriaki ; Mondoc, Daniel ^LU and Okubo, Susumu

organization

Mathematics (Faculty of Sciences)

publishing date

2010

type

Contribution to journal

publication status

published

subject

Mathematics

keywords

Lie superalgebras, triple systems

in

Algebras, Groups and Geometries

volume

2

issue

27

pages

191 - 206

publisher

Hadronic Press

ISSN

0741-9937

language

English

LU publication?

yes

id

fb8d3ecb-142e-4783-acce-07d31dc6a43c (old id 1857155)

date added to LUP

2016-04-01 13:22:11

date last changed

2018-11-21 20:15:25

@article{fb8d3ecb-142e-4783-acce-07d31dc6a43c,
  abstract     = {{In this paper we discuss $(\epsilon,\delta)$-Freudenthal Kantor triple systems<br/><br>
with certain structure on the subspace $L_{-2}$ of the corresponding standard<br/><br>
embedding five graded Lie (super)algebra $L(\epsilon,\delta):=L_{-2}\oplus L_{-1}\oplus L_0\oplus L_1\oplus L_2; [L_i,L_j]\subseteq L_{i+j}$. We recall Lie and Jordan structures associated with $(\epsilon,\delta)$-Freudenthal Kantor triple systems (see ref [26],[27]) and we give results for unitary and pseudo-unitary $(\epsilon,\delta)$-Freudenthal Kantor triple systems. Further, we give the notion of $\delta$-structurable algebras and connect them to $(-1,\delta)$-Freudenthal Kantor triple systems and the corresponding Lie (super)<br/><br>
algebra construction.}},
  author       = {{Kamiya, Noriaki and Mondoc, Daniel and Okubo, Susumu}},
  issn         = {{0741-9937}},
  keywords     = {{Lie superalgebras; triple systems}},
  language     = {{eng}},
  number       = {{27}},
  pages        = {{191--206}},
  publisher    = {{Hadronic Press}},
  series       = {{Algebras, Groups and Geometries}},
  title        = {{$(\epsilon,\delta)$-Freudenthal Kantor triple systems, $\delta$-structurable algebras and Lie superalgebras}},
  volume       = {{2}},
  year         = {{2010}},
}

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$(\epsilon,\delta)$-Freudenthal Kantor triple systems, $\delta$-structurable algebras and Lie superalgebras