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On the relevant domain of the Hilbert function of a finite multiprojective scheme
Published online by Cambridge University Press: 03 November 2025
Abstract
Let X be a zero-dimensional reduced subscheme of a multiprojective space 
$\mathbb {V} $. Let 
$s_i$ be the length of the projection of X onto the ith component of 
$\mathbb {V}$. A result of Van Tuyl states that the Hilbert function of X is completely determined by its restriction to the product of the intervals 
$[0, s_i - 1]$. We extend this result to arbitrary zero-dimensional subschemes of 
$\mathbb {V}$.
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- © The Author(s), 2025. Published by Cambridge University Press on behalf of Canadian Mathematical Society
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