Inclusion map

is a subset of and is a superset of

In mathematics, if is a subset of then the inclusion map is the function that sends each element of to treated as an element of

An inclusion map may also be referred to as an inclusion function, an insertion,[1] or a canonical injection.

A "hooked arrow" (U+21AA RIGHTWARDS ARROW WITH HOOK)[2] is sometimes used in place of the function arrow above to denote an inclusion map; thus:

(However, some authors use this hooked arrow for any embedding.)

This and other analogous injective functions[3] from substructures are sometimes called natural injections.

Given any morphism between objects and , if there is an inclusion map into the domain , then one can form the restriction of In many instances, one can also construct a canonical inclusion into the codomain known as the range of

  1. ^ MacLane, S.; Birkhoff, G. (1967). Algebra. Providence, RI: AMS Chelsea Publishing. p. 5. ISBN 0-8218-1646-2. Note that "insertion" is a function SU and "inclusion" a relation SU; every inclusion relation gives rise to an insertion function.
  2. ^ "Arrows – Unicode" (PDF). Unicode Consortium. Retrieved 2017-02-07.
  3. ^ Chevalley, C. (1956). Fundamental Concepts of Algebra. New York, NY: Academic Press. p. 1. ISBN 0-12-172050-0.

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