Monodromy of a family of hypersurfaces

Abstract

Let Y be an (m+1)-dimensional irreducible smooth complex projective variety embedded in a projective space. Let Z be a closed subscheme of Y, and δ be a positive integer such that IZ,Y(δ) is generated by global sections. Fix an integer d≥ δ +1, and assume the general divisor X ∈ |H0(Y,Z,Y(d))| is smooth. Denote by Hm(X; Q) Zvan the quotient of Hm(X; Q) by the cohomology of Y and also by the cycle classes of the irreducible components of dimension m of Z. In the present paper we prove that the monodromy representation on Hm(X; Q) Zvan for the family of smooth divisors X ∈ |H0(Y,Z,Y(d))| is irreducible.