On the slope conjecture of Barja and Stoppino for fibred surfaces
Abstract
Let f:\,S B be a locally non-trivial relatively minimal fibration of genus g≥ 2 with relative irregularity qf. It was conjectured by Barja and Stoppino that the slope λf≥ 4(g-1)g-qf. We prove the conjecture when qf is small with respect to g; we also construct counterexamples when g is odd and qf=(g+1)/2.
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