Quantizing the Eisenhart Lift
Kieran Finn, Sotirios Karamitsos, Apostolos Pilaftsis
TL;DR
This paper extends the classical Eisenhart lift to quantum systems and quantum field theory, demonstrating that the lifted manifold reproduces both classical and quantum effects, introduces conserved quantum numbers, and suggests implications for fundamental physics problems.
Contribution
The paper introduces a quantum version of the Eisenhart lift, showing it reproduces quantum effects and conserved quantities in quantum mechanics and quantum field theory, with potential implications for cosmology.
Findings
Lifted quantum systems reproduce original quantum dynamics.
Identification of a conserved quantum number in the lifted system.
Application to quantum field theory reveals conserved quantum charges.
Abstract
The classical Eisenhart lift is a method by which the dynamics of a classical system subject to a potential can be recreated by means of a free system evolving in a higher-dimensional curved manifold, known as the lifted manifold. We extend the formulation of the Eisenhart lift to quantum systems, and show that the lifted manifold recreates not only the classical effects of the potential, but also its quantum mechanical effects. In particular, we find that the solutions of the Schrodinger equations of the lifted system reduce to those of the original system after projecting out the new degrees of freedom. In this context, we identify a conserved quantum number, which corresponds to the lifted momentum of the classical system. We further apply the Eisenhart lift to Quantum Field Theory (QFT). We show that a lifted field space manifold is able to recreate both the classical and quantum…
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