Hyperbolic relaxation as a sufficient condition of a fully coherent ergodic field
作者: Fritz-Albert Popp , Ke-hsueh Li
DOI: 10.1007/BF00672857
关键词: Mathematics 、 Development (differential geometry) 、 Relaxation (physics) 、 Mathematical analysis 、 Ergodic theory 、 Excited state 、 Statistical physics 、 Field (physics) 、 Exponential law 、 Operator algebra 、 Operator (physics)
摘要: In three cases, one originating from a classical model, the second time-evolution operator, and third photocount statistics, it is shown that an initially excited coherent field which remains in time development relaxes according to hyperbolic rather than exponential law. This has particular relevance for analysis of biological systems.
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