Construction of quantum Dirac observables and the emergence of WKB time
Leonardo Chataignier
Abstract
We describe a method of construction of gauge-invariant operators (Dirac observables or ``evolving constants of motion'') from the knowledge of the eigenstates of the gauge generator in time-reparametrization invariant mechanical systems. These invariant operators evolve unitarily with respect to an arbitrarily chosen time variable. We emphasize that the dynamics is relational, both in the classical and quantum theories. In this framework, we show how the ``emergent Wentzel-Kramers-Brillouin time'' often employed in quantum cosmology arises from a weak-coupling expansion of invariant transition amplitudes, and we illustrate an example of singularity avoidance in a vacuum Bianchi I (Kasner) model.
Topics & Concepts
WKB approximationObservablePhysicsInvariant (physics)QuantumMathematical physicsDirac (video compression format)SingularityInitial singularityTheoretical physicsQuantum dynamicsCoupling constantQuantum mechanicsClassical mechanicsMathematicsDe Sitter universeUniverseMathematical analysisNeutrinoNoncommutative and Quantum Gravity TheoriesQuantum Mechanics and ApplicationsQuantum Mechanics and Non-Hermitian Physics