Secant varieties of generalised Grassmannians

Abstract

Secant varieties of a homogeneously embedded generalised Grassmannian G/P inherit the natural group action, and one can reduce the study of their local geometric properties to G-orbit representatives. The case of secant varieties of lines is particularly elegant as their G-orbits are induced by P-orbits in both G/P and g/p. Parabolic orbits are a classical problem in Representation Theory, well understood when G/P is cominuscule. Exploiting them, we provide a complete and uniform description of both the identifiable and singular loci of the secant variety of lines to any cominuscule variety. We also introduce a finer version of the 2-nd Terracini locus, called 2-nd strong-Terracini locus, and we determine it for cominuscule varieties. Finally, we analyse the non-cominuscule case of isotropic Grassmannians for comparison, and we highlight a few differences.

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