Tjurina spectrum and graded symmetry of missing spectral numbers
Abstract
For a hypersurface isolated singularity defined by a convergent power series f, the Steenbrink spectrum can be defined as the Poincar\'e polynomial of the graded quotients of the V-filtration on the Jacobian ring of f. The Tjurina subspectrum is defined by replacing the Jacobian ring with its quotient by the image of the multiplication by f. We prove that their difference (consisting of missing spectral numbers) has a canonical graded symmetry. This follows from the self-duality of the Jacobian ring, which is compatible with the action of f as well as the V-filtration. It implies for instance that the number of missing spectral numbers which are smaller than (n+1)/2 (with n the number of variables) is bounded by [(μ-τ)/2]. We can moreover improve the estimate of Briancon-Skoda exponent in the semisimple monodromy case.
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