The Seshadri Constants of Tangent Sheaves on Toric Varieties
Abstract
In this paper, we investigate the Seshadri constant (X,TX;p) of the tangent sheaf TX on a complete Q-factorial toric variety X. We show that (X,TX;1)>0 if and only if the following statement holds true: if a1v1+·s +akvk=0 where ai's are positive real numbers and vi's are primitive generators of some rays in the fan that defines X, then k≥ X+1. Based on the result, we show that a smooth projective toric variety X with (X,TX;p)>0 for some p∈ X is isomorphic to the projective space, confirming a special case of the conjecture proposed by M. Fulger and T. Murayama.
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