Colimit in the context of Inverse limit

👉 Colimit in the context of Inverse limit

In mathematics, an inverse limit (also called a projective limit) is a construction that allows one to "glue together" several related objects, the precise gluing process being specified by morphisms between the objects. Inverse limits can be defined in any category, although their existence depends on the category that is considered. They are a special case of the concept of a limit in category theory.

By working in the dual category—that is, by reversing the arrows—an inverse limit becomes a direct limit or inductive limit, and a limit becomes a colimit.

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Colimit in the context of Pushout (category theory)

In category theory, a branch of mathematics, a pushout (also called a fibered coproduct or fibered sum or cocartesian square or amalgamated sum) is the colimit of a diagram consisting of two morphisms f : Z → X and g : Z → Y with a common domain. The pushout consists of an object P along with two morphisms X → P and Y → P that complete a commutative square with the two given morphisms f and g. In fact, the defining universal property of the pushout (given below) essentially says that the pushout is the "most general" way to complete this commutative square. Common notations for the pushout are $P=X\sqcup _{Z}Y$ and $P=X+_{Z}Y$ .

The pushout is the categorical dual of the pullback.

View the full Wikipedia page for Pushout (category theory)

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Colimit in the context of Inverse limit

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👉 Colimit in the context of Inverse limit

Colimit in the context of Pushout (category theory)