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Non-Markovian diffusion over a parabolic potential barrier: Influence of the friction-memory function
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Date
2008-01-01
Author
YILMAZ, BÜLENT
Ayik, S.
Abe, Y.
Boilley, D.
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The over-passing probability across an inverted parabolic potential barrier is investigated according to the classical and quantal generalized Langevin equations. It is shown that, in the classical case, the asymptotic value of the over-passing probability is determined by a single dominant root of the "characteristic function," and it is given by a simple expression. The expression for the over-passing probability is quite general, and details of dissipation mechanism and memory effects enter into the expression only through the dominant root of the characteristic equation.
Subject Keywords
Statistics and Probability
,
Statistical and Nonlinear Physics
,
Condensed Matter Physics
URI
https://hdl.handle.net/11511/67732
Journal
PHYSICAL REVIEW E
DOI
https://doi.org/10.1103/physreve.77.011121
Collections
Department of Physics, Article
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B. YILMAZ, S. Ayik, Y. Abe, and D. Boilley, “Non-Markovian diffusion over a parabolic potential barrier: Influence of the friction-memory function,”
PHYSICAL REVIEW E
, pp. 0–0, 2008, Accessed: 00, 2020. [Online]. Available: https://hdl.handle.net/11511/67732.