On the representability of actions of unital algebras

Abstract

Working in the setting of ideally exact categories, we investigate the representability of actions of unital non-associative algebras over a field. We show that, in general, such categories fail to be action representable: for instance, the category of all unital algebras is not even action accessible. We then consider this problem in the context of operadic, action accessible, unit-closed varieties. Using the construction of the external weak actor, we prove that for any algebra X in such a variety V, the canonical map into its external weak actor is an isomorphism if and only if X is unital. Consequently, the ideally exact category V1 of unital algebras in V is action representable, and the actor of X is X itself. Finally, we prove action representability for unital Poisson algebras via an explicit construction of the universal strict general actor.

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