The Conjecture of Sally on the Hilbert Function for Curve Singularities

## Abstract We will show the Hodge conjecture and the Tate conjecture are true for the Hilbert schemes of points on an abelian surface or on a Kummer surface. (© 2006 WILEY‐VCH Verlag GmbH & Co. KGaA, Weinheim)

We work over any algebraically closed field F. However the applications are not vacuos only if char (F) > 0. A finite set S in a projective space V is said to be in t-unifomn position, t an integer, if for any two subsets A , B of S with card it is in t-uniform position for every t. 9 is called in

In this paper we prove, under the assumption that the Soule´regulator map is injective, that, for all integers k50, the description by the local Tamagawa number conjecture for CM elliptic curves defined over Q, corresponding to the values of their L-functions at k þ 2, is true.

In this paper we find an algorithm which computes the Hilbert function of schemes Z of ''fat points'' in ‫ސ‬ 3 whose support lies on a rational normal cubic curve C. The algorithm shows that the maximality of the Hilbert function in degree Ž t is related to the existence of fixed curves either C its