Quasi--Projective Reduction of Toric Varieties

Abstract

We define a quasi--projective reduction of a complex algebraic variety X to be a regular map from X to a quasi--projective variety that is universal with respect to regular maps from X to quasi--projective varieties. A toric quasi--projective reduction is the analogous notion in the category of toric varieties. For a given toric variety X we first construct a toric quasi--projective reduction. Then we show that X has a quasi--projective reduction if and only if its toric quasi--projective reduction is surjective. We apply this result to characterize when the action of a subtorus on a quasi--projective toric variety admits a categorical quotient in the category of quasi--projective varieties.

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