Fano manifolds of Picard number one whose co-tangent bundle is algebraically completely integrable system and its endomorphisms

Speakers: Sarbeswar Pal\n\nLet $X$ be a projective Fano manifold of Picard number one, different from the projective space. There is a folklore conjecture that any non-constant endomorphism of $X$ is an isomorphism. In the first half of  this talk, we will prove the folklore conjecture when the co-tangent bundle of $X$ is algebraically completely integrable system and the tangent bundle of $X$ is not nef. In the second half of the talk, we will give examples of a collection of projective Fano manifolds of Picard rank one (different from the moduli space of vector bundles on algebraic curves) whose co-tangent bundles are algebraically completely integrable system.  As applications of our main theorem and examples, in fact give alternative proofs of  three major results appeared in three different articles.\n \n \n\nhttps://indico.math.cnrs.fr/event/16541/