Sp(n)-orbits of isoclinic subspaces in the real Grassmannians

Abstract

In the framework of the study of the Sp(n)-orbits in the real Grassmannian G(k,4n) of k-dimensional non oriented subspaces of a real 4n-dimensional vector space V, here we consider the case of the isoclinic subspaces whose set we indicate with IC. Endowed V with an Hermitian quaternionic structure (Q,<,>), a subspace U is isoclinic if for any compatible complex structure A ∈ Q the principal angles of the pair (U,AU) are all the same, say θA. We will show that, fixed an admissible hypercomplex basis (I,J,K), to any such subspace U we can associate two set of invariants, namely a triple (,,η) and a pair (, ) where itself is a function of (,,η). We prove that the angles of isoclinicity (θI,θJ,θK) together with (,,η, ) determine its Sp(n)-orbit. In particular if U= 8k+2 or U= 8k+6 with k ≥ 0 the last set reduce to the pair (= 1,= 1).