Alexandru Dimca
Published 2012-10-05, updated 2012-12-24Version 4
Our main result describes the relation between the syzygies involving the first order partial derivatives $f_0,...,f_n$ of a homogeneous polynomial $f\in \C[x_0,...x_n]$ and the defect of the linear systems vanishing on the singular locus subscheme $\Sigma_f=V(f_0,...,f_n)$ of the hypersurface $D:f=0$ in the complex projective space $\PP^n$, when $D$ has only isolated singularities.
Comments: version 4: the discussion of the case when the singular locus is a complete intersection is added. The a-invariant and the Castelnuovo-Mumford regularity of the Milnor algebra are also explored
Flows of birational quadratic transformations in the complex projective space of dimension 3
Weak analytic hyperbolicity of generic hypersurfaces of high degree in the complex projective space of dimension 4
Compactifications of C^n and the complex projective space
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