Image (category theory)

Given a category C and a morphism f\colon X\to Y in C, the image of f is a monomorphism h\colon I\to Y satisfying the following universal property:

  1. There exists a morphism g\colon X\to I such that f = hg.
  2. For any object Z with a morphism k\colon X\to Z and a monomorphism l\colon Z\to Y such that f = lk, there exists a unique morphism m\colon I\to Z such that h = lm.

Remarks:

  1. such a factorization does not necessarily exist
  2. g is unique by definition of monic (= left invertible, abstraction of injectivity)
  3. m is monic.
  4. h=lm already implies that m is unique.
  5. k=mg


The image of f is often denoted by im f or Im(f).

One can show that a morphism f is epic if and only if f = im f.

Examples

In the category of sets the image of a morphism f\colon X \to Y is the inclusion from the ordinary image \{f(x) ~|~ x \in X\} to Y. In many concrete categories such as groups, abelian groups and (left- or right) modules, the image of a morphism is the image of the correspondent morphism in the category of sets.

In any normal category with a zero object and kernels and cokernels for every morphism, the image of a morphism f can be expressed as follows:

im f = ker coker f

This holds especially in abelian categories.

See also

References

This article is issued from Wikipedia - version of the Monday, January 11, 2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.