Automorphisms and some geodesic properties of ortho-Grassmann graphs

Abstract

Let H be a complex Hilbert space. Consider the ortho-Grassmann graph k(H) whose vertices are k-dimensional subspaces of H (projections of rank k) and two subspaces are connected by an edge in this graph if they are compatible and adjacent (the corresponding rank-k projections commute and their difference is an operator of rank 2). Our main result is the following: if H 2k, then every automorphism of k(H) is induced by a unitary or anti-unitary operator; if H=2k 6, then every automorphism of k(H) is induced by a unitary or anti-unitary operator or it is the composition of such an automorphism and the orthocomplementary map. For the case when H=2k=4 the statement fails. To prove this statement we compare geodesics of length two in ortho-Grassmann graphs and characterise compatibility (commutativity) in terms of geodesics in Grassmann and ortho-Grassmann graphs. At the end, we extend this result on generalised ortho-Grassmann graphs associated to conjugacy classes of finite-rank self-adjoint operators.