Nikolaos Tziolas
Published 2001-10-08Version 1
In order to calculate the multiplicity of an isolated rational curve C in a local complete intersection variety X, i.e. the length of the Hilbert scheme of X at [C], it is important to study infinitesimal neighborhoods of the curve in X. This is equivalent to infinitesimal extensions of P^1 by locally free sheaves. In this paper we study infinitesimal extensions of P^1, determine their structure and obtain upper and lower bounds for the length of the local rings of their Hilbert schemes at [P^].
Effective divisors on the Hilbert scheme of points in the plane and interpolation for stable bundles
Commuting matrices and the Hilbert scheme of points on affine spaces
Universal formulas for characteristic classes on the Hilbert schemes of points on surfaces
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