Chiral dynamics near exceptional points exhibit noise-sensitive oscillations at slow speeds, with speed and noise competing to determine the chirality measure χ_c according to a scaling law derived from perturbation theory.
Title resolution pending
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
fields
quant-ph 3verdicts
UNVERDICTED 3representative citing papers
The phase of the two-photon drive tunes Liouvillian exceptional points of order 2 and 3 in a cat qubit, identified by a winding-number topological invariant while preserving logical subspace fidelity.
Non-Hermitian and dissipative dynamics engineer magic steady states in qubits that attract every initial state to high-magic targets.
citing papers explorer
-
Chiral state conversion near an exceptional point: speed-noise competition
Chiral dynamics near exceptional points exhibit noise-sensitive oscillations at slow speeds, with speed and noise competing to determine the chirality measure χ_c according to a scaling law derived from perturbation theory.
-
Controllable non-Hermitian topology in a dynamically protected cat qubit
The phase of the two-photon drive tunes Liouvillian exceptional points of order 2 and 3 in a cat qubit, identified by a winding-number topological invariant while preserving logical subspace fidelity.
-
Magic Steady State Production: Non-Hermitian, Dissipative, and Stochastic Pathways
Non-Hermitian and dissipative dynamics engineer magic steady states in qubits that attract every initial state to high-magic targets.