Orthogonality preserving transformations of Hilbert Grassmannians

Abstract

Let H be a complex Hilbert space and let Gk(H) be the Grassmannian formed by k-dimensional subspaces of H. Suppose that H>2k and f is an orthogonality preserving injective transformation of Gk(H), i.e. for any orthogonal X,Y∈ Gk(H) the images f(X),f(Y) are orthogonal. If H=n is finite, then n=mk+i for some integers m 2 and i∈ \0,1,…,k-1\ (for i=0 we have m 3). We show that f is a bijection induced by a unitary or anti-unitary operator if i∈ \0,1,2,3\ or m i+1 5; in particular, the statement holds for k∈ \1,2,3,4\ and, if k 5, then there are precisely (k-4)(k-3)/2 values of n such that the above condition is not satisfied. As an application, we obtain a result concerning the case when H is infinite-dimensional.