Symmetries of Fano varieties

Abstract

We study Fano varieties endowed with a faithful action of a symmetric group, as well as analogous results for Calabi--Yau varieties, and log terminal singularities. We show the existence of a constant m(n), so that every symmetric group Sk acting on an n-dimensional Fano variety satisfies k ≤ m(n). We prove that m(n)> n+2n for every n. On the other hand, we show that n ∞ m(n)/(n+1)2 ≤ 1. However, this asymptotic upper bound is not expected to be sharp. We obtain sharp bounds for certain classes of varieties. For toric varieties, we show that m(n)=n+2 for n≥ 4. For Fano quasismooth weighted complete intersections, we prove the asymptotic equality n ∞ m(n)/(n+1)=1. Among the Fano weighted complete intersections, we study the maximally symmetric ones and show that they are closely related to the Fano--Fermat varieties, i.e., Fano complete intersections in PN cut out by Fermat hypersurfaces. Finally, we draw a connection between maximally symmetric Fano varieties and boundedness of Fano varieties. For instance, we show that the class of S8-equivariant Fano 4-folds forms a bounded family. In contrast, the S7-equivariant Fano 4-folds are unbounded.