morfismer

Morfismer are structure-preserving arrows between objects in a category. In category theory, a category is a collection of objects and morfismer (arrows) that go from one object to another, together with a rule for composing morfismer and with an identity morfisme for every object. The defining laws are that composition is associative and that composing any morfisme with an identity morfisme yields the same morfisme.

In concrete categories, morfismer correspond to familiar structure-preserving maps. Examples include functions between sets in the

Key concepts related to morfismer include monomorphisms, epimorphisms and isomorphisms. A monomorfism (left-cancellable) behaves like an

Morfismer form the backbone of category-theoretic reasoning. They allow the formal expression of constructions, factorization, and