The geometry of Frobenius on toric varieties
Abstract
We give a geometric description of the positivity of the Frobenius-trace kernel on a Q-factorial projective toric variety. To do so, we define its Frobenius support as well as the notions of F-effectiveness for divisors and 1-cycles. As it turns out, the interaction of the corresponding cone of F-effective curves with the Mori cone of curves reflects the type of extremal Mori contractions that the variety can undergo. As a corollary, we obtain that the Frobenius-trace kernel is ample if and only if the Picard rank is 1.
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