Monoid (category theory) category theory , a branch of mathematics , a monoid monoidal category is an object M together with two morphisms μ : M ⊗ M → M called multiplication , η : I → M called unit , the pentagon diagram I is the unit element and α, λ and ρ are respectively the associativity, the left identity and the right identity of the monoidal category C .comonoid in a monoidal category C is a monoid in the dual category C op .C has a symmetry γ . A monoid M in C is commutative when μ o γ = μ .Examples A monoid object in Set , the category of sets , is a monoid in the usual sense . A monoid object in Top , the category of topological spaces , is a topological monoid . A monoid object in the category of monoids is just a commutative monoid . This follows easily from the Eckmann–Hilton argument . A monoid object in the category of complete join-semilattices Sup is a unital quantale . A monoid object in, the category of abelian groups , is a ring . For a commutative ring R , a monoid object in *, the category of modules over R , is an R -algebra. * the category of graded modules is a graded R -algebra. * the category of chain complexes of R -modules is a differential graded algebra . A monoid object in K -Vect , the category of K -vector spaces, is a K -algebra, and a comonoid object is a K -coalgebra. For any category C , the category of its endofunctors has a monoidal structure induced by the composition and the identity functor I C monad on C . For any category with finite products , every object becomes a comonoid object via the diagonal morphism . Dually in a category with finite coproducts every object becomes a monoid object via. C , a morphism f : M → M ' is a morphism of monoids whenwords , the following diagramsC and their monoid morphisms is written Mon C
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