On classical finite probability theory as a quantum probability calculus

Abstract

This paper shows how the classical finite probability theory (with equiprobable outcomes) can be reinterpreted and recast as the quantum probability calculus of a pedagogical or "toy" model of quantum mechanics over sets (QM/sets). There have been four previous attempts to develop a quantum-like model with the base field of C replaced by Z2, but they are all forced into a merely "modal" interpretation by requiring the brackets to take values in Z2 (1 = possible, 0 = impossible). But the usual QM brackets <|φ> give the "overlap" between states and φ, so for subsets S,T of U, the natural definition is <S|T>=|ST|. This allows QM/sets to be developed with a full probability calculus that turns out to be the perfectly classical Laplace-Boole finite probability theory. The point is not to clarify finite probability theory but to elucidate quantum mechanics itself by seeing some of its quantum features (e.g., two-slit experiment) in a classical setting.