Affiliation:
1. Department of Mathematics, University of Trento, 38123 Povo, TN, Italy
Abstract
We continue the study of Terracini loci formed by x points of a variety embedded in a projective space. Our main results are a refined study of Terracini loci arising from linear projections, the description of the maximal x with a non-empty Terracini locus for Hirzebruch surfaces, and the maximal “weight”, “corank”, or “defect” in several cases. For low x, we even show which defects can occur.
Reference21 articles.
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