On the Grothendieck-Lefschetz Theorem for a Family of Varieties

Abstract

Let k be an algebraically closed field of characteristic p>0, W the ring of Witt vectors over k and R the integral closure of W in the algebraic closure K of K:=Frac(W); let moreover X be a smooth, connected and projective scheme over W and H a relatively very ample line bundle over X. We prove that when dim(X/W)≥ 2 there exists an integer d0, depending only on X, such that for any d≥ d0, any Y∈ |H d| connected and smooth over W and any y∈ Y(W) the natural R-morphism of fundamental group schemes π1(YR,yR) π1(XR,yR) is faithfully flat, XR, YR, yR being respectively the pull back of X, Y, y over Spec(R). If moreover dim(X/W)≥ 3 then there exists an integer d1, depending only on X, such that for any d≥ d1, any Y∈ |H d| connected and smooth over W and any section y∈ Y(W) the morphism π1(YR,yR) π1(XR,yR) is an isomorphism.