Classical mechanics as the high-entropy limit of quantum mechanics

TL;DR

This paper demonstrates that classical mechanics emerges as the high-entropy limit of quantum mechanics, where quantum effects are masked by entropy, providing a new perspective on the quantum-classical transition.

Contribution

It introduces a novel interpretation of the classical limit as a high-entropy regime, independent of specific mechanisms or interpretations of quantum states and entropy.

Findings

High entropy states approximate classical distributions.

The limit $ abla o 0$ is reinterpreted as high entropy rather than $ abla o 0$.

Classical mechanics can be derived from quantum mechanics through high-entropy limits.

Abstract

We show that classical mechanics can be recovered as the high-entropy limit of quantum mechanics. That is, the high entropy masks quantum effects, and mixed states of high enough entropy can be approximated with classical distributions. The mathematical limit $\hbar \to 0$ can be reinterpreted as setting the zero entropy of pure states to $-\infty$, in the same way that non-relativistic mechanics can be recovered mathematically with $c \to \infty$. Physically, these limits are more appropriately defined as $S \gg 0$ and $v \ll c$. Both limits can then be understood as approximations independently of what circumstances allow those approximations to be valid. Consequently, the limit presented is independent of possible underlying mechanisms and of what interpretation is chosen for both quantum states and entropy.