Fano hypersurfaces with arbitrarily large degrees of irrationality

Abstract: We show that complex Fano hypersurfaces can have arbitrarily large degrees of irrationality. More precisely, if we fix a Fano index e, then the degree of irrationality of a very general complex Fano hypersurface of index e and dimension n is bounded from below by a constant times $\sqrt{n}$. To our knowledge this gives the first examples of rationally connected varieties with degrees of irrationality greater than 3. The proof follows a degeneration to characteristic p argument which Koll\'ar used to prove nonrationality of Fano hypersurfaces. Along the way we show that in a family of varieties, the invariant "the minimal degree of a dominant rational map to a ruled variety" can only drop on special fibers. As a consequence, we show that for certain low-dimensional families of varieties the degree of irrationality also behaves well under specialization.