Sweedler Duality for BiHom-associative Algebras

Abstract

Motivated by the fact that ordinary linear duality does not in general produce a coalgebra structure from an infinite-dimensional algebra, we develop a Sweedler-type finite dual construction for BiHom-associative algebras. For a BiHom-algebra (G,μ,α,β) over a field, we define its Sweedler dual G⊂eq G* as the subspace of linear functionals annihilating a finite-codimensional BiHom-ideal of G. We prove that G carries a natural BiHom-coalgebra structure whose comultiplication is the restriction of μ*, and that BiHom-algebra morphisms induce BiHom-coalgebra morphisms on Sweedler duals. We further extend this construction to right BiHom-modules, obtaining right BiHom-comodules over G under a surjectivity assumption on the twisting map β. The Hom and classical cases are recovered by the specializations α=β and α=β=Id, respectively.