On orthoposets of numerical events in quantum logic

TL;DR

This paper explores the structure of general sets of events in quantum logic, focusing on orthoposets of numerical events, their interrelations, and conditions under which they form lattices, unifying various quantum logics.

Contribution

It characterizes GSEs as posets using states and investigates their properties as orthoposets and lattices, connecting them to known quantum logics.

Findings

Orthoposets of GSEs are characterized and related to known logics.

Conditions for GSEs to be lattices are discussed.

Representation of algebras of S-probabilities within the GSE framework.

Abstract

Let S be a set of states of a physical system and p(s) the probability of the occurrence of an event when the system is in state s in S. Such a function p from S to [0,1] is known as a numerical event or more accurately an S-probability. A set P of numerical events including the constant functions 0 and 1 and 1-p with every p in P becomes a poset when ordered by the order of real functions and can serve as a general setting for quantum logics. We call such a poset P a general set of events (GSE). The thoroughly investigated algebras of S-probabilities (including Hilbert logics), concrete logics and Boolean algebras can all be represented within this setting. In this paper we study various classes of GSEs, in particular those that are orthoposets and their interrelations and connections to known logics. Moreover, we characterize GSEs as posets by means of states and discuss the situation for GSEs to be lattices.