Homological Quantum Mechanics
Abstract
We provide a formulation of quantum mechanics based on the cohomology of the Batalin-Vilkovisky (BV) algebra. Focusing on quantum-mechanical systems without gauge symmetry we introduce a homotopy retract from the chain complex of the harmonic oscillator to finite-dimensional phase space. This induces a homotopy transfer from the BV algebra to the algebra of functions on phase space. Quantum expectation values for a given operator or functional are computed by the function whose pullback gives a functional in the same cohomology class. This statement is proved in perturbation theory by relating the perturbation lemma to Wick's theorem. We test this method by computing two-point functions for the harmonic oscillator for position eigenstates and coherent states. Finally, we derive the Unruh effect, illustrating that these methods are applicable to quantum field theory.
Cite
@article{arxiv.2112.11495,
title = {Homological Quantum Mechanics},
author = {Christoph Chiaffrino and Olaf Hohm and Allison F. Pinto},
journal= {arXiv preprint arXiv:2112.11495},
year = {2024}
}
Comments
52 pages, v2: new subsection 4.5, to appear in JHEP