On the Classification of Toric Fano Varieties.
G. Ewald (1988)
Discrete & computational geometry
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Displaying similar documents to “Some results on the integral geometry of unions of independent families.”
On the Classification of Toric Fano Varieties.
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We count integer points on varieties given by bihomogeneous equations using the Hardy-Littlewood method. The main novelty lies in using the structure of bihomogeneous equations to obtain asymptotics in generically fewer variables than would be necessary in using the standard approach for homogeneous varieties. Also, we consider counting functions where not all the variables have to lie in intervals of the same size, which arises as a natural question in the setting of bihomogeneous varieties. ...
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