Information AboutCokernel |
| CATEGORIES ABOUT COKERNEL | |
| abstract algebra | |
| category theory | |
| isomorphism theorems | |
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Cokernels are Dual to the Kernels Of Category Theory , hence the name. In many situations in of ''Y'' by the Image of ''f''. In Topological settings, such as with bounded linear operators between Hilbert spaces, one typically has to take the Closure of the image before passing to the quotient. FORMAL DEFINITION One can define the cokernel in the general framework of of ''f'' and the zero morphism 0''XY'' : ''X'' → ''Y''. Explicitly, this means the following. The cokernel of ''f'' : ''X'' → ''Y'' is an object ''Q'' together with a Morphism ''q'' : ''Y'' → ''Q'' such that the diagram Commutes . Moreover the morphism ''q'' must be Universal for this diagram, i.e. any other such ''q''′: ''Y'' → ''Q''′ can be obtained by composing ''q'' with a unique morphism ''u'' : ''Q'' → ''Q''′: As with all universal constructions the cokernel, if it exists, is unique Up To a unique Isomorphism , or more precisely: if ''q'' : ''Y'' → ''Q'' and ''q‘'' : ''Y'' → ''Q‘'' are two cokernels of ''f'' : ''X'' → ''Y'', then there exists a unique isomorphism ''u'' : ''Q'' → ''Q‘'' with ''q‘'' = ''u'' ''q''. Like all . Conversely an epimorphism is called '' Normal '' (or ''conormal'') if it is the cokernel of some morphism. A category is called ''conormal'' if every epimorphism is normal (e.g. the Category Of Groups is conormal). Examples In the of ''H'' by the Normal Closure of the image of ''f''. In the case of Abelian Group s, since every Subgroup is normal, the cokernel is just ''H'' Modulo the image of ''f'': :coker(''f'') = ''H'' / im(''f''). Special cases In a Preadditive Category , it makes sense to add and subtract morphisms. In such a category, the Coequalizer of two morphisms ''f'' and ''g'' (if it exists) is just the cokernel of their difference: :coeq(''f'', ''g'') = coker(''g'' - ''f'') In a Pre-abelian Category (a special kind of preadditive category) the existence of kernels and cokernels is guaranteed. In such categories the Image and Coimage of a morphism ''f'' are given by :im(''f'') = ker(coker ''f'') :coim(''f'') = coker(ker ''f'') Abelian Categories are even better behaved with respect to cokernels. In particular, every abelian category is conormal (and normal as well). That is, every Epimorphism ''e'' : ''A'' → ''B'' can be written as the cokernel of some morphism. Specifically, ''e'' is the cokernel of its own kernel: :e = coker(ker ''e'') |
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