On the rank of the flat unitary summand of the Hodge bundle

Abstract

Let f S B be a non-isotrivial fibred surface. We prove that the genus g, the rank uf of the unitary summand of the Hodge bundle f*ωf and the Clifford index cf satisfy the inequality uf ≤ g - cf. Moreover, we prove that if the general fibre is a plane curve of degree ≥ 5 then the stronger bound uf ≤ g - cf-1 holds. In particular, this provides a strengthening of the bounds of BGN and of FNP. The strongholds of our arguments are the deformation techniques developed by the first author in Rigid and by the third author and Pirola in PT, which display here naturally their power and depht.