In this paper we describe an analytic method able to give the multiplication table(s) of the set(s) involved in an S-expansion process (with either resonance or 0_S-resonant-reduction) for reaching a target Lie (super)algebra from a starting one, after having properly chosen the partitions over subspaces of the considered (super)algebras. This analytic method gives us a simple set of expressions to find the subset decomposition of the set(s) involved in the process. Then, we use the information coming from both the initial (super)algebra and the target one for reaching the multiplication table(s) of the mentioned set(s). Finally, we check associativity with an auxiliary computational algorithm, in order to understand whether the obtained set(s) can describe semigroup(s) or just abelian set(s) connecting two (super)algebras. We also give some interesting examples of application, which check and corroborate our analytic procedure and also generalize some result already presented in the literature.
An analytic method for S-Expansion involving resonance and reduction / CALDERON IPINZA, Marcelo; Lingua, Fabio; Peñafiel, D. M.; Ravera, Lucrezia. - In: FORTSCHRITTE DER PHYSIK. - ISSN 0015-8208. - STAMPA. - 64:11-12(2016), pp. 854-880. [10.1002/prop.201600094]
An analytic method for S-Expansion involving resonance and reduction
CALDERON IPINZA, MARCELO;LINGUA, FABIO;Peñafiel, D. M.;RAVERA, LUCREZIA
2016
Abstract
In this paper we describe an analytic method able to give the multiplication table(s) of the set(s) involved in an S-expansion process (with either resonance or 0_S-resonant-reduction) for reaching a target Lie (super)algebra from a starting one, after having properly chosen the partitions over subspaces of the considered (super)algebras. This analytic method gives us a simple set of expressions to find the subset decomposition of the set(s) involved in the process. Then, we use the information coming from both the initial (super)algebra and the target one for reaching the multiplication table(s) of the mentioned set(s). Finally, we check associativity with an auxiliary computational algorithm, in order to understand whether the obtained set(s) can describe semigroup(s) or just abelian set(s) connecting two (super)algebras. We also give some interesting examples of application, which check and corroborate our analytic procedure and also generalize some result already presented in the literature.File | Dimensione | Formato | |
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https://hdl.handle.net/11583/2655530