Font Size:
a
A
A
Classification Of Lie Superalgebras
Posted on:
2007-10-24
Degree:
Master
Type:
Thesis
Country:
China
Candidate:
Z G Wang
Full Text:
PDF
GTID:
2120360185461644
Subject:
Basic mathematics
Abstract/Summary:
PDF Full Text Request
In this paper we describe a simple method for obtaining a classification of small-dimensional solvable Lie superalgebras. Using this method, we obtain the classification of the Lie superalgebras with dimension no more than four.
Keywords/Search Tags:
Lie Superalgebras
,
Classification
,
Low Dimension
PDF Full Text Request
Related items
1
Classification Of Leibniz Superalgebras
2
Maximal Dimension Of Purely Odd Subalgebras Of Jordan Superalgebras And Representations
3
Derivation Superalgebras Of Infinite-dimension Modular Lie Superalgebras W(m,q,n)
4
Central Extensions Of A Class Of Lie Superalgebras
5
A Class Of Finite-modular Lie Superalgebras
6
Hom-Bisuperalgebras And Double Extension Of Quasdratic Hom-Lie Superalgebras
7
Construction Of Quadratic Hom-Lie Superalgebras And Struction On R-Hom-Lie Superalgebras
8
Some Properties Of Tortken Superalgebras And The Classification Of Low Dimensional Tortken Superalgebras
9
A Class Of Superderivations Subalgebras And Central Factor Superalgebras
10
The Derivation Algebras Of Lie Superalgebras And Simple Lie Superalgebrs