Birational rigidity and alpha invariants of Fano varieties
Abstract
We prove that for every ε>0, there is a birationally super-rigid Fano variety X such that 12≤slantα(X)≤slant 12+ε. Also we show that for every ε>0, there is a Fano variety X and a finite subgroup G⊂Aut(X) such that X is G-birationally super-rigid, and αG(X)<ε.
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