Multiplier ideals of normal surface singularities

Abstract

We study the multiplier ideals and the corresponding jumping numbers and multiplicities \m(c)\c∈ R in the following context: (X,o) is a complex analytic normal surface singularity, a⊂ OX,o is an mX,o--primary ideal, φ:X X is a log resolution of a such that aOX=OX(-F), for some nonzero effective divisor F supported on φ-1(0). We show that \m(c)\c>0 is combinatorially computable from F and the resolution graph of φ, and we provide several formulae. We also extend Budur's result (valid for (X,o)=(C2,0)), which makes an identification of Σc∈[0,1]m(c)tc with a certain Hodge spectrum. In our general case we use Hodge spectrum with coefficients in a mixed Hodge module. We show that \m(c)\c≤ 0 usually depends on the analytic type of (X,o). However, for some distinguished analytic types we determine it concretely. E.g., when (X,o) is weighted homogeneous (and F is associated with the central vertex), we recover Σcm(c)tc from the Poincar\'e series of (X,o) and when (X,o) is a splice quotient then we recover Σcm(c)tc from the multivariable topological Poincar\'e (zeta) function of .

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