An inequality on polarized endomorphisms

Abstract

We show that assuming the standard conjectures, for any smooth projective variety X of dimension n over an algebraically closed field, there is a constant C>0 such that for any positive rational number r and for any polarized endomorphism f of X, we have \[ \| Gr f \| C \, deg(Gr f), \] where Gr is a correspondence of X so that for each 0 i 2n its pullback action on the i-th Weil cohomology group is the multiplication-by-ri map. This inequality has been conjectured by the authors to hold in a more general setting, which - in the special case of polarized endomorphisms - confirms the validity of the analog of a well known result by Serre in the K\"ahler setting.