Lifting free divisors

Abstract

Let :X S be a morphism between smooth complex analytic spaces, and let f=0 define a free divisor on S. We prove that if the deformation space T1X/S of is a Cohen-Macaulay OX-module of codimension 2, and all of the logarithmic vector fields for f=0 lift via , then f =0 defines a free divisor on X; this is generalized in several directions. Among applications we recover a result of Mond-van Straten, generalize a construction of Buchweitz-Conca, and show that a map :Cn+1 Cn with critical set of codimension 2 has a T1X/S with the desired properties. Finally, if X is a representation of a reductive complex algebraic group G and is the algebraic quotient X S=X// G with X// G smooth, we describe sufficient conditions for T1X/S to be Cohen-Macaulay of codimension 2. In one such case, a free divisor on Cn+1 lifts under the operation of "castling" to a free divisor on Cn(n+1), partially generalizing work of Granger-Mond-Schulze on linear free divisors. We give several other examples of such representations.