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
2 Pith papers cite this work. Polarity classification is still indexing.
2
Pith papers citing it
fields
quant-ph 2verdicts
UNVERDICTED 2representative citing papers
A hypersphere-like non-Abelian Yang monopole is identified in the 5D parameter space of a 4D non-Hermitian system and topologically characterized via the second Chern number.
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.
-
A hypersphere-like non-Abelian Yang monopole and its topological characterization
A hypersphere-like non-Abelian Yang monopole is identified in the 5D parameter space of a 4D non-Hermitian system and topologically characterized via the second Chern number.