Minimal Terracini Loci in a Plane and Their Generalizations

Abstract

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We study properties of the minimal Terracini loci, i.e., families of certain zero-dimensional schemes, in a projective plane. Among the new results here are: a maximality theorem and the existence of arbitrarily large gaps or non-gaps for the integers x for which the minimal Terracini locus in degree d is non-empty. We study similar theorems for the critical schemes of the minimal Terracini sets. This part is framed in a more general framework.

Keywords

• projective plane
• Terracini locus
• double points
• Veronese embedding
• zero-dimensional scheme
• Hilbert function