Wigner's type theorem in terms of linear operators which send projections of a fixed rank to projections of other fixed rank

Abstract

Let H be a complex Hilbert space whose dimension is not less than 3 and let Fs(H) be the real vector space formed by all self-adjoint operators of finite rank on H. For every non-zero natural k< H we denote by Pk(H) the set of all rank k projections. Let H' be other complex Hilbert space of dimension not less than 3 and let L: Fs(H) Fs(H') be a linear operator such that L( Pk(H))⊂ Pm(H') for some natural k,m and the restriction of L to Pk(H) is injective. If H=H' and k=m, then L is induced by a linear or conjugate-linear isometry of H to itself, except the case H=2k when there is another one possibility (we get a classical Wigner's theorem if k=m=1). If H 2k, then k m. The main result describes all linear operators L satisfying the above conditions under the assumptions that H is infinite-dimensional and for any P,Q∈ Pk(H) the dimension of the intersection of the images of L(P) and L(Q) is not less than m-k.