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Kernel (category theory)
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==Relationship to algebraic kernels== [[Universal algebra]] defines a [[kernel (universal algebra)|notion of kernel]] for homomorphisms between two [[algebraic structure]]s of the same kind. This concept of kernel measures how far the given homomorphism is from being [[injective]]. There is some overlap between this algebraic notion and the categorical notion of kernel since both generalize the situation of groups and modules mentioned above. In general, however, the universal-algebraic notion of kernel is more like the category-theoretic concept of [[kernel pair]]. In particular, kernel pairs can be used to interpret kernels in monoid theory or ring theory in category-theoretic terms.
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