Terracini loci and a codimension one Alexander-Hirschowitz theorem
Abstract
The Terracini locus T(n, d; x) is the locus of all finite subsets S of Pn of cardinality x such that S = Pn, h0(I2S(d)) > 0, and h1(I2S(d)) > 0. The celebrated Alexander-Hirschowitz Theorem classifies the triples (n,d,x) for which (n, d; x)=xn. Here we fully characterize the next step in the case n=2, namely, we prove that T(2,d;x) has at least one irreducible component of dimension 2x-1 if and only if either (d,x)∈\(4,4),(4,6), (5,6),(5,7), (6,9),(6,10)\, or d 7, d 1,2 3 and x=(d+2)(d+1)/6.
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