Litcius/Paper detail

Passage through exceptional point: case study

Miloslav Znojil

2020Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences18 citationsDOIOpen Access PDF

Abstract

The description of unitary evolution using non-Hermitian but ‘hermitizable’ Hamiltonians H is feasible via an ad hoc metric Θ = Θ ( H ) and a (non-unique) amendment 〈 ψ 1 | ψ 2 〉 → 〈 ψ 1 | Θ | ψ 2 〉 of the inner product in Hilbert space. Via a proper fine-tuning of Θ ( H ) this opens the possibility of reaching the boundaries of stability (i.e. exceptional points) in many quantum systems sampled here by the fairly realistic Bose–Hubbard (BH) and discrete anharmonic oscillator (AO) models. In such a setting, it is conjectured that the EP singularity can play the role of a quantum phase-transition interface between different dynamical regimes. Three alternative ‘AO ↔ BH’ implementations of such an EP-mediated dynamical transmutation scenario are proposed and shown, at an arbitrary finite Hilbert-space dimension N , exact and non-numerical.

Topics & Concepts

Unitary stateSingularityQuantumDimension (graph theory)AnharmonicityMetric (unit)Hilbert spaceTheoretical physicsProduct (mathematics)MathematicsDynamical systems theoryQuantum stateInterface (matter)Quantum systemStability (learning theory)PhysicsType (biology)Gravitational singularityMeasure (data warehouse)Binary numberQuantum mechanicsQuantum operationAlgebra over a fieldSingularity theoryQuantum Mechanics and Non-Hermitian PhysicsQuantum chaos and dynamical systemsSpectral Theory in Mathematical Physics