First-principle evolution Hamiltonian operator: derivation from ADM quantum constraints and quantum reference-frame conditions

TL;DR

This paper derives a universal formula for the evolution Hamiltonian operator in quantum gravity, expressed through quantum constraints and frame conditions, enabling Schrödinger evolution in a quantum relational framework.

Contribution

It introduces a first-principle, universal formula for the evolution Hamiltonian in quantum gravity based on quantum constraints and reference frame conditions.

Findings

Provides a formula encoding full interactions in quantum constraints.

Enables Schrödinger evolution with quantum relational observables.

Applies to any Dirac theory of quantum gravity with well-defined constraints.

Abstract

For any Dirac theory of quantum gravity governed by a set of well-defined quantum constraints, we discover a universal formula for the exact form of the evolution Hamiltonian operator in a variable quantum reference frame of our construction, expressed in terms of the quantum-constraint operators and frame-condition operators as the only inputs. Due to the first-principle nature of the formula, the evolution Hamiltonian operator contains the full interactions encoded in the quantum constraints, and it generates the Schr\"odinger evolution described by the genuine quantum relational observables associated to the frame and acting in the physical Hilbert space solving the quantum constraints.