Zero morphism category theory , a branch of mathematics , a zero morphism is a special kind of morphism exhibiting properties like the morphisms to and from a zero object .Definitions Suppose C is a category , and f : X → Y is a morphism in C . The morphism f is called a constant morphism if for any object W in C and any, fg = fh . Dually, f is called a coconstant morphism if for any object Z in C and any g , h : Y → Z , gf = hf . A zero morphism is one that is both a constant morphism and a coconstant morphism.category with zero morphisms is one where, for every two objects A and B in C , there is a fixed morphism 0AB A → B , and this collection of morphisms is such that for all objects X , Y , Z in C and all morphisms f : Y → Z , g : X → Y , the following diagram commutes:XY compatible system of zero morphisms.C is a category with zero morphisms, then the collection of 0XY defining a "zero morphism" and the phrase "a category with zero morphisms" separately is unfortunate, but if each hom-set has a ″zero morphism", then the category "has zero morphisms".Examples If C has a zero object 0 , given two objects X and Y in C , there are canonical morphisms f : X → 0 and g : 0 → Y . Then, gf is a zero morphism in MorC XY X → 0 → Y .define the notions of kernel and cokernel for any morphism in that category.
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