The Lefschetz Type Theorem For Fundamental Group Schemes

Abstract

Let k be a field, X a connected scheme proper over k, D⊂neq X an ample effective connected divisor, x∈ D(k). For Tannakian categories CX and CD whose objects consist of vector bundles on X and D respectively, we establish general Tannakian criteria for the natural homomorphism \(π(CD,x) π(CX,x)\) to be faithfully flat, a closed immersion, or an isomorphism. As applications, under Langer type positivity assumptions, we prove that \(π(D,x) π(X,x)\) is an isomorphism for ∈\S,N,EN,F, EF,Loc,ELoc,et,Eet,uni\ over perfect fields.