Superalgebra in Characteristic 2
Abstract
Following the work of Siddharth Venkatesh, we study the category . This category is a proposed candidate for the category of supervector spaces over fields of characteristic (as the ordinary notion of a supervector space does not make sense in charcacteristic ). In particular, we study commutative algebras in , known as -algebras, which are ordinary associative algebras together with a linear derivation satisfying the twisted commutativity rule: . In this paper, we generalize many results from standard commutative algebra to the setting of -algebras; most notably, we give two proofs of the statement that Artinian -algebras may be decomposed as a direct product of local -algebras. In addition, we show that there exists no noncommutative -algebras of dimension , and that up to isomorphism there exists exactly one -algebra of dimension . Finally, we give the notion of a Lie algebra in the category , and we state and prove the Poincare-Birkhoff-Witt theorem for this category.
Cite
@article{arxiv.1804.00824,
title = {Superalgebra in Characteristic 2},
author = {Aaron Kaufer},
journal= {arXiv preprint arXiv:1804.00824},
year = {2018}
}