 |
|
| |
|
|
|
at Global Oneness Community.
Share your dreams and let others help you with the interpretation!
Dream Sharing Forum
|
|
Preadditive category - Elementary properties | | Preadditive category - Elementary properties: Encyclopedia II - Preadditive category - Elementary properties | | Because every hom-set Hom(A,B) is an abelian group, it has a zero element 0. This is the zero morphism from A to B. Because composition of morphisms is bilinear, the composition of a zero morphism and any other morphism (on either side) must be another zero morphism. If you think of composition as analogous to multiplication, then this says that multiplication by zero always results in a product of zero, which is a familiar intuition. Extending this analogy, the fact that composition is bilinear in gener ...
See also:Preadditive category, Preadditive category - Examples, Preadditive category - Elementary properties, Preadditive category - Additive functors, Preadditive category - Biproducts, Preadditive category - Kernels and cokernels, Preadditive category - Special cases | | | Preadditive category, Preadditive category - Additive functors, Preadditive category - Biproducts, Preadditive category - Elementary properties, Preadditive category - Examples, Preadditive category - Kernels and cokernels, Preadditive category - Special cases | | |
| | | Preadditive category: Encyclopedia II - Preadditive category - Elementary properties
Preadditive category - Elementary properties
Because every hom-set Hom(A,B) is an abelian group, it has a zero element 0. This is the zero morphism from A to B. Because composition of morphisms is bilinear, the composition of a zero morphism and any other morphism (on either side) must be another zero morphism. If you think of composition as analogous to multiplication, then this says that multiplication by zero always results in a product of zero, which is a familiar intuition. Extending this analogy, the fact that composition is bilinear in general becomes the distributivity of multiplication over addition.
Focusing on a single object A in a preadditive category, these facts say that the endomorphism hom-set Hom(A,A) is a ring, if we define multiplication in the ring to be composition. This ring is the endomorphism ring of A. Conversely, every ring (with identity) is the endomorphism ring of some object in some preadditive category. Indeed, given a ring R, we can define a preadditive category R to have a single object A, let Hom(A,A) be R, and let composition be ring multiplication. Since R is an Abelian group and multiplication in a ring is bilinear (distributive), this makes R a preadditive category. Category theorists will often think of the ring R and the category R as two different representations of the same thing, so that a particularly perverse category theorist might define a ring as a preadditive category with exactly one object.
In this way, preadditive categories can be seen as a generalisation of rings. Many concepts from ring theory, such as ideals, Jacobson radicals, and factor rings can be generalized in a straightforward manner to this setting. When attempting to write down these generalizations, one should think of the morphisms in the preadditive category as the "elements" of the "generalized ring". We won't go into such depth in this article.
Other related archives0, Abelian category, Additive category, Jacobson radicals, abelian groups, additive, additive category, bilinear, category, category of abelian groups, closed monoidal category, coequaliser, cokernel, commutativity, coproduct, coterminal, direct sum, distinct, distributivity, endomorphism, enriched, epimorphism, equaliser, factor rings, field, finite, function, functor, functor category, group homomorphism, group homomorphisms, groups, hom-set, ideals, identity, identity morphism, iff, infinite, integers, kernel, kernel of a homomorphism, mathematics, matrices, medial category, modules, monoidal category, monomorphism, natural transformations, normal, one, perverse, pre-Abelian, pre-Abelian category, product, ring, ring homomorphism, terminal, trivial ring, vector spaces, zero, zero group, zero morphism, zero object
 Adapted from the Wikipedia article "Elementary properties", under the G.N U Free Docmentation License. Please also see http://en.wikipedia.org/wiki |
|
|
|
More material related to Preadditive Category can be found here:
|
|
|
« Back
|
Search the Global Oneness web site |
|
|
|
|
|
Sneak-Peek of Global Oneness Community
Hi friend! The Global Oneness Community, the place for information and sharing about Oneness is not really launched yet (you will see there is still some clean up to do) ...but it is now open for a sneak-peek! And if you wish - please register and become one of the very first members to do so! Jonas
Forum Home,
Articles,
Photo Gallery,
Videos,
News,
Sitemap
...and much more!
|
