Canonical Uncertainty Relations for Madelung Variables in Curved Spacetime
Abstract
We establish fundamental uncertainty relations for the hydrodynamic variables arising from the Madelung representation of quantum fields in curved spacetime. Through canonical quantization of the density $n$ and phase $θ$ variables and their conjugate momenta, we derive exact uncertainty principles that depend on spacetime geometry through the lapse function $N$ and spatial metric $γ_{ij}$. These relations reveal how gravitational fields modulate quantum fluctuations and provide first-principles...
Description / Details
We establish fundamental uncertainty relations for the hydrodynamic variables arising from the Madelung representation of quantum fields in curved spacetime. Through canonical quantization of the density and phase variables and their conjugate momenta, we derive exact uncertainty principles that depend on spacetime geometry through the lapse function and spatial metric . These relations reveal how gravitational fields modulate quantum fluctuations and provide first-principles constraints for scalar field dark matter models and stochastic quantum gravity.
Source: arXiv:2604.04784v1 - http://arxiv.org/abs/2604.04784v1 PDF: https://arxiv.org/pdf/2604.04784v1 Original Link: http://arxiv.org/abs/2604.04784v1
Please sign in to join the discussion.
No comments yet. Be the first to share your thoughts!
Apr 7, 2026
Quantum Computing
Quantum Physics
0