Automorphisms and superalgebra structures on the Grassmann algebra
Abstract
Let be a field of characteristic zero and let be the Grassmann algebra of an infinite dimensional -vector space . In this paper we study the superalgebra structures (that is the -gradings) that the algebra admits. By using the duality between superalgebras and automorphisms of order we prove that in many cases the -graded polynomial identities for such structures coincide with the -graded polynomial identities of the "typical" cases , and where the vector space is homogeneous. Recall that these cases were completely described by Di Vincenzo and Da Silva in \cite{disil}. Moreover we exhibit a wide range of non-homogeneous -gradings on that are -isomorphic to , and . In particular we construct a -grading on with only one homogeneous generator in which is -isomorphic to the natural -grading on , here denoted by .
Cite
@article{arxiv.2009.00175,
title = {Automorphisms and superalgebra structures on the Grassmann algebra},
author = {Alan de Araújo Guimarães and Plamen Koshlukov},
journal= {arXiv preprint arXiv:2009.00175},
year = {2020}
}
Comments
19 pages