Semistable Higgs bundles on elliptic surfaces

Abstract

We analyze Higgs bundles (V,φ) on a class of elliptic surfaces π:X B, whose underlying vector bundle V has vertical determinant and is fiberwise semistable. We prove that if the spectral curve of V is reduced, then φ is vertical, while if V is fiberwise regular with reduced (resp. integral) spectral curve, and if its rank and second Chern number satisfy an inequality involving the genus of B and the degree of the fundamental line bundle of π (resp., if the fundamental line bundle is sufficiently ample), then φ is scalar. We apply these results to the problem of characterizing slope-semistable Higgs bundles with vanishing discriminant in terms of the semistability of their pull-backs via maps from arbitrary (smooth, irreducible, complete) curves to X.