Derivations of negative degree on quasihomogeneous isolated complete intersection singularities.

Our main results are Theorem 4 which expresses the Tjurina number of certain Gorenstein singularities in terms of Du Bois invariants and Hodge numbers of the link, and Theorem 6

For time-delay systems with negative degree it has been shown that if for zero delay the system is globally asymp- totically stable, then for any delay it is converging to some

We give all the polynomials functions of degree 20 which are APN over an infinity of field extensions and show they are all CCZ-equivalent to the function x 5 , which is a new step

shown is that for a general hypersurface X of high degree, the image of the Abel- Jacobi is no larger than what is required if the Hodge Conjecture is going to

singularities constructed above are all of Heisenberg type as Chern classes of ample line bundles over abelian varieties are non-degenerate (see, for example [4, p..

They proved that any y-constant de- formation of curves is topologically equisingular in the classical sense (two singular germs embedded in a smooth germ are said

ON THE HOMOLOGY AND COHOMOLOGY OF COMPLETE INTERSECTIONS WITH ISOLATED SINGULARITIES.. Alexandru

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