Dimension of the punctual Hilbert scheme

In this short note, we compute the dimension of the open subset of the Hilbert scheme, Hilh,(,,P", parametrizing AG closed subschemes X c P" of codimension 3. @ I998 Elsevier Science B.V. All rights reserved.

A sequence of positive integers with positive lower density contains a Hilbert (or combinatorial) cube size c log log n up to n. We prove that c log log n cannot be replaced by c$ -log n log log n. ## 1999 Academic Press In [1] D. Hilbert showed (using different terminology) that for any k 1, if N

## Abstract In this paper we construct __G__‐Hilbert schemes for finite group schemes __G__. We find a construction of __G__‐Hilbert schemes as relative __G__‐Hilbert schemes over the quotient that does not need the Hilbert scheme of __n__ points, works under more natural assumptions and gives addi

We obtain local equations for the toric Hilbert scheme, which parametrizes all ideals with the same multigraded Hilbert function as a given toric ideal. We also prove a conjecture of Sturmfels' providing a criterion for an ideal to have such a Hilbert function.

We prove that for each countable Abelian group G and for each natural number n there exists an absorbing set in the Hilbert cube for the class of strongly finite-dimensional (in the sense of covering dimension) spaces X with dimG X < n. 0 1997 Elsevier Science B.V.