Is the category of sets locally small?

Is the category of sets locally small?

Definition A category is said to be locally small if each of its hom-sets is a small set, i.e., is a set instead of a proper class. Local smallness is included by some authors in the definition of “category.” In other words, a locally small category is a Set-category, i.e. a category enriched in the category Set.

Are categories sets?

In brief, set theory is about membership while category theory is about structure-preserving transformations – but only about the relationships between those transformations. Set theory is only about membership (i.e. being an element) and what can be expressed in terms of that (e.g. being a subset).

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Is category a set?

The phrase “category of sets” indicates that this theory treats the collection of sets as a structured object — a category consisting of sets and functions between them. Sets is a category, i.e. it consists of two kinds of things: objects, which we call sets, and arrows, which we call functions.

What is a large category?

A large category is a category which is not (necessarily) small. There are some variations in usage depending on the foundations chosen. Also, not all authors agree on whether a large category is not small, or merely not necessarily small (i.e., whether small categories are also large).

What is category theory programming?

Category theory concerns itself with how objects map to other objects. A functional programmer would interpret such morphisms as functions, but in a sense, you can also think of them as well-defined behaviour that’s associated with data. The objects of category theory are universal abstractions.

Is there a category of all categories?

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No, there is no category of all categories.

Is the category of groups an Abelian category?

In mathematics, an abelian category is a category in which morphisms and objects can be added and in which kernels and cokernels exist and have desirable properties. The motivating prototypical example of an abelian category is the category of abelian groups, Ab.

What is category type?

is that category is a group, often named or numbered, to which items are assigned based on similarity or defined criteria while type is a grouping based on shared characteristics; a class.

What is a locally small category?

A category is said to be locally small if each of its hom-sets is a small set, i.e., is a set instead of a proper class. Local smallness is included by some authors in the definition of “category.” In other words, a locally small category is a Set -category, i.e. a category enriched in the category Set.

What is a locally small set?

Contents 1 Definition 0.1. A category is said to be locally small if each of its hom-sets is a small set, i.e., is a set instead of a proper class. 2 Remarks 0.2. This is more commonly used in enriched category theory where the hom-objects have more structure than a set and can support more interesting properties. 3 Related concepts 0.3

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Is a 2-category locally discrete or locally groupoidal?

Likewise, a 2-category is said to be locally discrete if its hom-categories are discrete (so it is essentially an ordinary category), locally groupoidal if its hom-categories are groupoids, and so on.