Group object

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1. Template:Lb Given a category C, any object X ∈ C on which morphisms are defined corresponding to the group theoretic concepts of a binary operation (called multiplication), identity and inverse, such that multiplication is associative and properties are satisfied that correspond to the existence of inverse elements and the identity element.
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     The identity is obviously a homomorphism from a group object to itself. Furthermore, the composite of homomorphisms of group objects is still a homomorphism; thus, group objects in a fixed category form a category, which we denote by ${\displaystyle \text{Grp}(C)}$.

Alternatively, and more concisely, an object ${\displaystyle X\in C}$ such that for any ${\displaystyle Y\in C}$, the set of morphisms ${\displaystyle {\text{Hom}}_C(Y,X)}$ is a group and the correspondence ${\displaystyle Y\to {\text{Hom}}_C(Y,X)}$ is a functor from ${\displaystyle C}$ into the category of groups ${\displaystyle \text{Gr}}$.

Group objects generalise the concept of group to objects of greater complexity than mere sets. In the process, attention is withdrawn from individual elements and placed more strongly on operations. A typical example of a group object might be a topological group where the object is a topological space on which the group operations are differentiable.

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