Semi-stable vector bundles on fibred varieties

Abstract

Let π:Y X be a surjective morphism between two irreducible, smooth complex projective varieties with dimY> dimX >0. We consider polarizations of the form Lc=L+c·π*A on Y, with c>0, where L,A are ample line bundles on Y,X respectively. For c sufficiently large, we show that the restriction of a torsion free sheaf F on Y to the generic fibre of π is semi-stable as soon as F is Lc-semi-stable; conversely, if F is L-stable on , then F is Lc-stable. We obtain explicit lower bounds for c satisfying these properties. Using this result, we discuss the construction of semi-stable vector bundles on Hirzebruch surfaces and on P2-bundles over P1, and establish the irreducibility and the rationality of the corresponding moduli spaces.