Rationally connected rational double covers of primitive Fano varieties
Abstract
We show that for a Zariski general hypersurface V of degree M+1 in PM+1 for M≥slant 5 there are no Galois rational covers X V of degree d≥slant 2 with an abelian Galois group, where X is a rationally connected variety. In particular, there are no rational maps X V of degree 2 with X rationally connected. This fact is true for many other families of primitive Fano varieties as well and motivates a conjecture on absolute rigidity of primitive Fano varieties.
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