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Emergent parallel transport and curvature in Hermitian and non-Hermitian quantum mechanics

Chia-Yi Ju, Adam Miranowicz, Yueh-Nan Chen, Guang-Yin Chen, Franco Nori

2024Quantum19 citationsDOIOpen Access PDF

Abstract

Studies have shown that the Hilbert spaces of non-Hermitian systems require nontrivial metrics. Here, we demonstrate how evolution dimensions, in addition to time, can emerge naturally from a geometric formalism. Specifically, in this formalism, Hamiltonians can be interpreted as a Christoffel symbol-like operators, and the Schroedinger equation as a parallel transport in this formalism. We then derive the evolution equations for the states and metrics along the emergent dimensions and find that the curvature of the Hilbert space bundle for any given closed system is locally flat. Finally, we show that the fidelity susceptibilities and the Berry curvatures of states are related to these emergent parallel transports.

Topics & Concepts

Hermitian matrixCurvatureFormalism (music)Hilbert spaceChristoffel symbolsBerry connection and curvatureHermitian symmetric spaceMathematical physicsPhysicsSchrödinger equationSchrödinger's catClassical mechanicsMathematicsFiber bundleQuantumQuantum mechanicsMathematical analysisBundleHermitian manifoldGeometryRicci curvatureVisual artsArtMaterials scienceMusicalComposite materialQuantum Mechanics and Non-Hermitian PhysicsQuantum chaos and dynamical systemsTopological Materials and Phenomena
Emergent parallel transport and curvature in Hermitian and non-Hermitian quantum mechanics | Litcius