Blowups of smooth hypersurfaces, their birational geometry and divisorial stability

Abstract

Let X be a smooth n-dimensional Fano hypersurface in Pn+1 where n ≥ 3. Let be a smooth positive-dimensional complete intersection of X, a hypersurface and one of more hyperplanes in Pn+1. Let Y X be the blowup of X along . Let Y → X be the blowup of X along . We describe the Mori chamber decomposition of Y and its associated birational models. In particular, we show that Y is a Mori dream space. We classify for which X and the variety Y is a Fano manifold and, if X is a hyperplane, we classify the elementary Sarkisov links initiated by . Finally, we use this Mori chamber decomposition above to prove that certain Fano manifolds as above do not admit a K\"ahler-Einstein metric.

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