A note on Griffiths' conjecture about the positivity of Chern-Weil forms

Abstract

Let (E,h) be a Griffiths semipositive Hermitian holomorphic vector bundle of rank 3 over a complex manifold. In this paper, we prove the positivity of the characteristic differential form c1(E,h) c2(E,h) - c3(E,h) , thus providing a new evidence towards a conjecture by Griffiths about the positivity of the Schur polynomials in the Chern forms of Griffiths semipositive vector bundles. As a consequence, we establish a new chain of inequalities between Chern forms. Moreover, we point out how to obtain the positivity of the second Chern form c2(E,h) in any rank, starting from the well-known positivity of such form if (E,h) is just Griffiths positive of rank 2 . The final part of the paper gives an overview on the state of the art of Griffiths' conjecture, collecting several remarks and open questions.