Towards a criterion for slope stability of Fano manifolds along divisors

Abstract

We give a simple criterion for slope stability of Fano manifolds X along divisors or smooth subvarieties. As an application, we show that X is slope stable along an ample effective divisor D⊂ X unless X is isomorphic to a projective space and D is a hyperplane section. We also give counterexamples to Aubin's conjecture on the relation between the anticanonical volume and the existence of a K\"ahler-Einstein metric. Finally, we consider the case that X=3; we give a complete answer for slope (semi)stability along divisors of Fano threefolds.