### Some articles on *morphism, morphisms*:

Nisnevich Topology - Definition

... A

... A

**morphism**of schemes f Y → X is called a Nisnevich**morphism**if it is an étale**morphism**such that for every (possibly non-closed) point x ∈ X, there exists a point y ∈ Y ... A family of**morphisms**{uα Xα → X} is a Nisnevich cover if each**morphism**in the family is étale and for every (possibly non-closed) point x ∈ X, there exists α and a point y ∈ Xα s.t ... If the family is finite, this is equivalent to the**morphism**from to X being a Nisnevich**morphism**...Mathematical Object - Category Theory

... theory, which abstracts sets as objects and the operations thereon as

... theory, which abstracts sets as objects and the operations thereon as

**morphisms**between those objects ... of abstraction mathematical objects reduce to mere vertices of a graph whose edges as the**morphisms**abstract the ways in which those objects can transform and whose ...List Of Zero Terms - Zero

... A zero

**Morphisms**... A zero

**morphism**in a category is a generalised absorbing element under function composition any**morphism**composed with a zero**morphism**gives a zero**morphism**... Specifically, if 0XY X → Y is the zero**morphism**among**morphisms**from X to Y, and f A → X and g Y → B are arbitrary**morphisms**, then g ∘ 0XY = 0XB and 0XY ∘ f = 0AY ... If a category has a zero object 0, then there are canonical**morphisms**X → 0 and 0 → Y, and composing them gives a zero**morphism**0XY X → Y ...Factorization System

... for a category C consists of two classes of

... for a category C consists of two classes of

**morphisms**E and M of C such that E and M both contain all isomorphisms of C and are closed under composition ... Every**morphism**f of C can be factored as for some**morphisms**and ... The factorization is functorial if and are two**morphisms**such that for some**morphisms**and, then there exists a unique**morphism**making the following diagram commute ...Category Of Rings - Properties -

... studied in mathematics, there do not always exist

**Morphisms**... studied in mathematics, there do not always exist

**morphisms**between pairs of objects in Ring ... For example, there are no**morphisms**from the trivial ring 0 to any nontrivial ring ... A necessary condition for there to be**morphisms**from R to S is that the characteristic of S divide that of R ...Main Site Subjects

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