Preserver problems for the logics associated to Hilbert spaces and related Grassmannians

Abstract

We consider the standard quantum logic L(H) associated to a complex Hilbert space H, i.e. the lattice of closed subspaces of H together with the orthogonal complementation. The orthogonality and compatibility relations are defined for any logic. In the standard quantum logic, they have a simple interpretation in terms of operator theory. For example, two closed subspaces (propositions in the logic L(H)) are compatible if and only if the projections on these subspaces commute. We present both classical and more resent results on transformations of L(H) and the associated Grassmannians which preserve the orthogonality or compatibility relation. The first result in this direction was classical Wigner's theorem.