Fibred surfaces and their unitary rank

Abstract

Let f S B a complex fibred surface with fibres of genus g≥ 2. Let uf be its unitary rank, i.e., the rank of the maximal unitary summand of the Hodge bundle f*ωf. We prove many new slope inequalities involving uf and some other invariants of the fibration. As applications: (1) we prove a new Xiao-type bound on uf with respect to g for non-isotrivial fibrations: \[ uf< g5g-26g-3. \] In particular this implies that if f is not locally trivial and uf=g-1 is maximal, then g≤ 6; (2) we prove a result in the direction of the Coleman-Oort conjecture: a new constraint on the rank of the (-1,0) part of the maximal unitary Higgs subbundle of a curve generically contained in the Torelli locus.