Order topology on orthocomplemented posets of linear subspaces of a pre-Hilbert space

Abstract

Motivated by the Hilbert-space model for quantum mechanics, we define a pre-Hilbert space logic to be a pair (S,), where S is a pre-Hilbert space and is an orthocomplemented poset of orthogonally closed linear subspaces of S, closed w.r.t. finite dimensional perturbations, (i.e. if M∈ and F is a finite dimensional linear subspace of S, then M+F∈ ). We study the order topology τo() on and show that completeness of S can by characterized by the separation properties of the topological space (,τo()). It will be seen that the remarkable lack of a proper probability-theory on pre-Hilbert space logics -- for an incomplete S -- comes out elementarily from this topological characterization.