Stable Higgs Bundles on ruled surfaces

Abstract

Let π : X = PC(E) C be a ruled surface over an algebraically closed field k of characteristic 0, with a fixed polarization L on X. In this paper, we show that pullback of a (semi)stable Higgs bundle on C under π is a L-(semi)stable Higgs bundle. Conversely, if (V,θ) is a L-(semi)stable Higgs bundle on X with c1(V)= π*( d ) for some divisor d of degree d on C and c2(V)=0, then there exists a (semi)stable Higgs bundle (W,) of degree d on C whose pullback under π is isomorphic to (V,θ). As a consequence, we get an isomorphism between the corresponding moduli spaces of (semi)stable Higgs bundles. We also show the existence of non-trivial stable Higgs bundle on X whenever g(C)≥ 2 and the base field is C.