Quantum Correlations and the Measurement Problem

TL;DR

This paper explores how quantum correlations differ from classical ones, emphasizing their role in the measurement problem, and proposes a new perspective that resolves apparent inconsistencies in quantum measurement outcomes.

Contribution

It introduces a novel interpretation of quantum correlations that addresses the measurement problem by replacing classical assumptions with a consistent quantum framework.

Findings

Quantum correlations lie outside the classical local correlation polytope.

Replacing classical assumptions with quantum convex sets resolves measurement inconsistencies.

The approach clarifies the role of information loss and definiteness in quantum measurements.

Abstract

The transition from classical to quantum mechanics rests on the recognition that the structure of information is not what we thought it was: there are operational, i.e., phenomenal, probabilistic correlations that lie outside the polytope of local correlations. Such correlations cannot be simulated with classical resources, which generate classical correlations represented by the points in a simplex, where the vertices of the simplex represent joint deterministic states that are the common causes of the correlations. The `no go' hidden variable theorems tell us that we can't shoe-horn correlations outside the local polytope into a classical simplex by supposing that something has been left out of the story. The replacement of the classical simplex by the quantum convex set as the structure representing probabilistic correlations is the analogue for quantum mechanics of the replacement of Newton's Euclidean space and time by Minkowski spacetime in special relativity. The nonclassical features of quantum mechanics, including the irreducible information loss on measurement, are generic features of correlations that lie outside the local correlation polytope. This paper is an elaboration of these ideas, and its consequences for the measurement problem of quantum mechanics. A large part of the difficulty is removed by seeing that the inconsistency in reconciling the entangled state at the end of a quantum measurement process with the definiteness of the macroscopic pointer reading and the definiteness of the correlated value of the measured micro-observable is only apparent and depends on a stipulation that is not required by the structure of the quantum possibility space. Replacing this stipulation by an alternative consistent stipulation resolves the problem.