A Non-Separated Version of Kajiwara's Construction
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1999
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A'Campo-Neuen, Annette
Hausen, Jürgen
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In 1998, T. Kajiwara proved that a toric variety X with enough invariant Cartier-divisors admits a presentation as a geometric quotient of some quasi-affine toric variety. Here having enough invariant Cartier-divisors means that the complement of every invariant affine chart of X occurs as the support of some effective invariant Cartier-divisor of X. We generalize Kajiwara's result to toric prevarieties of affine intersection that have enough invariant Cartier-divisors.
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A'CAMPO-NEUEN, Annette, Jürgen HAUSEN, 1999. A Non-Separated Version of Kajiwara's ConstructionBibTex
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