Stable linear systems of skew-symmetric forms of generic rank less than or equal to 4

Abstract

Given a 6-dimensional complex vector space W, we consider linear systems of skew-symmetric forms on W. The n-dimensional linear systems this kind, that can also be interpreted as n-dimensional linear subspaces of P(2 W*), are parametrized by the projective space P(Cn+1 2 W*). We analyze the SL(W) action on this projective space and the GIT stability of linear systems with respect to this action. We present a classification of all stable orbits of linear systems whose generic element is a tensor of rank 4.