Resolving Schr\"{o}dinger's analysis of the Einstein-Podolsky-Rosen paradox: an incompleteness criterion and weak elements of reality

TL;DR

This paper revisits Schrödinger's response to the EPR paradox, proposing a new criterion for quantum mechanics' incompleteness based on weak macroscopic realism, supported by simulations and feasible experiments.

Contribution

It introduces a novel incompleteness criterion for quantum mechanics using Schrödinger's analysis and weak macroscopic realism, with practical experimental implications.

Findings

A feasible criterion for quantum incompleteness is derived.

Simulations show emergence of simultaneous definite values for $ ext{X}$ and $ ext{P}$.

The approach resolves questions raised by Schrödinger about the EPR paradox.

Abstract

The Einstein-Podolsky-Rosen (EPR) paradox was presented as an argument that quantum mechanics is an incomplete description of physical reality. However, the premises on which the argument is based are falsifiable by Bell experiments. In this paper, we examine the EPR paradox from the perspective of Schrodinger's reply to EPR. Schrodinger pointed out that the correlated states of the paradox enable the simultaneous measurement of $\hat{x}$ and $\hat{p}$, one by direct, the other by indirect measurement. Schrodinger's analysis takes on a timely importance because a recent experiment realizes these correlations for macroscopic atomic systems. Different to the original argument, Schrodinger's analysis applies to the experiment at the time when the measurement settings have been fixed. In this context, a subset of local realistic assumptions (not negated by Bell's theorem) implies that $x$ and $p$ are simultaneously precisely defined. Hence, an alternative EPR argument can be presented that quantum mechanics is incomplete, based on a set of (arguably) nonfalsifiable premises. As systems are amplified, macroscopic realism can be invoked, and the premises are referred to as weak macroscopic realism (wMR). In this paper, we propose a realization of Schrodinger's gedanken experiment where field quadrature phase amplitudes $\hat{X}$ and $\hat{P}$ replace position and momentum. Assuming wMR, we derive a criterion for the incompleteness of quantum mechanics, showing that the criterion is feasible for current experiments. Questions raised by Schrodinger are resolved. By performing simulations based on an objective-field ($Q$-based) model for quantum mechanics, we illustrate the emergence on amplification of simultaneous predetermined values for $\hat{X}$ and $\hat{P}$. The values can be regarded as weak elements of reality, along the lines of Bell's macroscopic beables.