Fano schemes of sub-maximal elementary symmetric functions
Abstract
Denote by Er the rth elementary symmetric polynomial in V variables for a vector space V over an infinite field . We describe the rational points on the Fano scheme Fd-1(Z(E V-1)) of projective (d-1)-spaces contained in the zero locus of E V-1. Isolated points exist precisely for V=2d, in which case they are in bijection with the 1· 3·s (2d-1) pairings on a 2d-element set. This, in particular, confirming a conjecture of Ambartsoumian, Auel and Jebelli to the effect that (over R) all isolated points are recoverable via integral star transforms with appropriate symbols.
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