Higher index Fano varieties with finitely many birational automorphisms
Abstract
Determining when the birational automorphism group of a Fano variety is finite is an interesting and difficult problem. The main technique for studying this problem is by the Noether-Fano method. This method has been effective in studying this problem for Fano varieties of index one and two. The purpose of this paper is to give a new approach to this problem, and to show that in every positive characteristic there are Fano varieties of arbitrarily large index with finite (or even trivial) birational automorphisms. To do this we prove that these varieties admit ample and birationally equivariant line bundles. Our result applies the differential forms that Koll\'ar produces on p-cyclic covers in characteristic p>0.
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