Symmetries of algebras captured by actions of weak Hopf algebras

Abstract

In this paper, we present a generalization of well-established results regarding symmetries of -algebras, where is a field. Traditionally, for a -algebra A, the group -algebra automorphisms of A captures the symmetries of A via group actions. Similarly, the Lie algebra of derivations of A captures the symmetries of A via Lie algebra actions. In this paper, given a category C whose objects possess -linear monoidal categories of modules, we introduce an object SymC(A) that captures the symmetries of A via actions of objects in C. Our study encompasses various categories whose objects include groupoids, Lie algebroids, and more generally, cocommutative weak Hopf algebras. Notably, we demonstrate that for a positively graded non-connected -algebra A, some of its symmetries are naturally captured within the weak Hopf framework.