Toric varieties whose blow-up at a point is Fano
Abstract
We classify smooth toric Fano varieties of dimension n≥ 3 containing a toric divisor isomorphic to n-1. As a consequence of this classification, we show that any smooth complete toric variety X of dimension n≥ 3 with a T-fixed point x∈ X such that the blow-up Bx(X) of X at x is Fano is isomorphic either to n or to the blow-up of n along a n-2. As expected, such results are proved using toric Mori theory due to Reid.
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