Bott vanishing for Fano 3-folds

Abstract

Bott proved a strong vanishing theorem for sheaf cohomology on projective space, namely that Hj(X,iX L)=0 for every j>0, i≥ 0, and L ample. This holds for toric varieties, but not for most other varieties. We classify the smooth Fano 3-folds that satisfy Bott vanishing. There are many more than expected. Along the way, we conjecture that for every projective birational morphism π X Y of smooth varieties, and every line bundle A on X that is ample over Y, the higher direct image sheaf Rjπ*(iX A) is zero for every j>0 and i≥ 0.