Secant varieties of generalised Grassmannians

Vincenzo Galgano

Published 2024-10-10Version 1

The secant varieties to flag varieties $G/P$ are central objects in Tensor Decomposition. The natural group action they inherit allows one to reduce the study of 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 $\mathfrak{g}/\mathfrak{p}$. Parabolic orbits are a classical problem in Representation Theory, well understood for generalised Grassmannians. Exploiting such orbits, we provide a complete and uniform description of both the identifiable and singular loci of the secant variety of lines to any cominuscule variety, as well as of the second Terracini locus. We also show that non-cominuscule varieties behave differently.