On a conjecture of Bitoun and Schedler
Abstract
Suppose that X is a smooth complex algebraic variety of dimension ≥ 3 and f defines a hypersurface Z in X, with a unique singular point P. Bitoun and Schedler conjectured that the D-module generated by 1f has length equal to gP(Z)+2, where gP(Z) is the reduced genus of Z at P. We prove that this length is always ≥ gP(Z)+2 and equality holds if and only if 1f lies in the D-module generated by I0(f)1f, where I0(f) is the multiplier ideal J(f1-ε), with 0<ε 1. In particular, we see that the conjecture holds if the pair (X,Z) is log canonical. We can also recover, with an easy proof, the result of Bitoun and Schedler saying that the conjecture holds for weighted homogeneous isolated singularities. On the other hand, we give an example (a polynomial in 3 variables with an ordinary singular point of multiplicity 4) for which the conjecture does not hold.
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