Higher structures for Lie $H$-pseudoalgebras
Abstract
Let be a cocommutative Hopf algebra. The notion of Lie -pseudoalgebra is a multivariable generalization of Lie conformal algebras. In this paper, we study some higher structures related to Lie -pseudoalgebras where we increase the flexibility of the Jacobi identity. Namely, we first introduce -pseudoalgebras (also called strongly homotopy Lie -pseudoalgebras) as the homotopy analogue of Lie -pseudoalgebras. We give several equivalent descriptions of such homotopy algebras and show that some particular classes of these homotopy algebras are closely related to the cohomology of Lie -pseudoalgebras and crossed modules of Lie -pseudoalgebras. Next, we introduce another higher structure, called Lie- -pseudoalgebras which are the categorification of Lie -pseudoalgebras. Finally, we show that the category of Lie- -pseudoalgebras is equivalent to the category of certain -pseudoalgebras.
Cite
@article{arxiv.2403.10777,
title = {Higher structures for Lie $H$-pseudoalgebras},
author = {Apurba Das},
journal= {arXiv preprint arXiv:2403.10777},
year = {2024}
}
Comments
22 pages; Comments are welcome