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semilattice object
Redirected from "semilattice in a symmetric monoidal category with diagonals".
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Context
Algebra
algebra , higher algebra universal algebra monoid , semigroup , quasigroup nonassociative algebra associative unital algebra commutative algebra Lie algebra , Jordan algebra Leibniz algebra , pre-Lie algebra Poisson algebra , Frobenius algebra lattice , frame , quantale Boolean ring , Heyting algebra commutator , center monad , comonad distributive law
Group theory
Ring theory
Module theory
Categorical algebra
Monoid theory
Category theory
Contents
Idea
The notion of a semilattice object is the generalization of that of semilattice category of sets into more general ambient categories with suitable properties.
Definition
In a symmetric monoidal category with diagonals ( C , ⊗ , I , Δ ) (C, \otimes, I, \Delta) semilattice object is a commutative monoid object ( M , μ , η ) (M, \mu, \eta) μ ∘ Δ M = id M \mu \circ \Delta_M = \mathrm{id}_M Δ M \Delta_M diagonal morphism of M M id M \mathrm{id}_M identity morphism of M M
See also
Last revised on June 14, 2025 at 09:15:11.
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