Categories of orthogonality spaces

Abstract

An orthogonality space is a set equipped with a symmetric and irreflexive binary relation. We consider orthogonality spaces with the additional property that any collection of mutually orthogonal elements gives rise to the structure of a Boolean algebra. Together with the maps that preserve the Boolean structures, we are led to the category N O S of normal orthogonality spaces. Moreover, an orthogonality space of finite rank is called linear if for any two distinct elements e and f there is a third one g such that exactly one of f and g is orthogonal to e and the pairs e, f and e, g have the same orthogonal complement. Linear orthogonality spaces arise from finite-dimensional Hermitian spaces. We are led to the full subcategory L O S of N O S and we show that the morphisms are the orthogonality-preserving lineations. Finally, we consider the full subcategory E O S of L O S whose members arise from positive definite Hermitian spaces over Baer ordered -fields with a Euclidean fixed field. We establish that the morphisms of E O S are induced by generalised semiunitary mappings.