Quasi-separated morphism algebraic geometry , a morphism of schemes f from X to Y is called quasi-separated if the diagonal map from X to X ×Y X is quasi-compact. A scheme X is called quasi-separated if the morphism to Spec Z is quasi-separated. Quasi-separated algebraic spaces and algebraic stacks and morphisms between them are defined in a similar way, though some authors include the condition that X is quasi-separated as part of the definition of an algebraic space or algebraic stack X . Quasi-separated morphisms were introduced by as a generalization of separated morphisms.natural morphisms are quasi-separated but not separated.Examples If X is a locally Noetherian scheme then any morphism from X to any scheme is quasi-separated, and in particular X is a quasi-separated scheme. Any separated scheme or morphism is quasi-separated. The line with two origins over a field is quasi-separated over the field but not separated. If X is an "infinite dimensional vector space with two origins" over a field K then the morphism from X to spec K is not quasi-separated. More precisely X consists of two copies of Spec K glued together by identifying the nonzero points in each copy . The quotient of an algebraic space by an infinite discrete group acting freely is often not quasi-separated. For example if K is a field of characteristic 0 then the quotient of the affine line by the group Z of integers is an algebraic space that is not quasi-separated. This algebraic space is also an example of a group object in the category of algebraic spaces that is not a scheme; quasi-separated algebraic spaces that are group objects are always group schemes. There are similar examples given by taking the quotient of the group scheme G m complex numbers by a lattice.
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