Standard
Stochastic resonance. / Dykman, Mark
; Luchinsky, D. G.; Mannella, R. et al.
Nonlinearity and Chaos in Engineering Dynamics. ed. / J. M. T. Thompson; S. R. Bishop. New York: Wiley, 1994. p. 275-284.
Research output: Contribution in Book/Report/Proceedings - With ISBN/ISSN › Chapter
Harvard
Dykman, M
, Luchinsky, DG, Mannella, R
, McClintock, PVE, Soskin, SM, Stein, ND & Stocks, NG 1994,
Stochastic resonance. in JMT Thompson & SR Bishop (eds),
Nonlinearity and Chaos in Engineering Dynamics. Wiley, New York, pp. 275-284.
APA
Dykman, M.
, Luchinsky, D. G., Mannella, R.
, McClintock, P. V. E., Soskin, S. M., Stein, N. D., & Stocks, N. G. (1994).
Stochastic resonance. In J. M. T. Thompson, & S. R. Bishop (Eds.),
Nonlinearity and Chaos in Engineering Dynamics (pp. 275-284). Wiley.
Vancouver
Author
Dykman, Mark
; Luchinsky, D. G. ; Mannella, R. et al. /
Stochastic resonance. Nonlinearity and Chaos in Engineering Dynamics. editor / J. M. T. Thompson ; S. R. Bishop. New York : Wiley, 1994. pp. 275-284
Bibtex
@inbook{b1e23321f52e45e6a672b6e19e01aa30,
title = "Stochastic resonance.",
abstract = "We review stochastic resonance (SR), a counter-intuitive phenomenon in which the signal due to a weak periodic force in a nonlinear system can be enhanced by the addition of external noise. A theoretical approach based on linear response theory (LRn is described. It is pointed out that, although the LRT theory of SR is by definition restricted to the small-signal limit. it possesses substantial advantages in terms of simplicity, generality and predictive power. We outline the application of LRT to overdamped motion in a bistable potential, the most commonly studied form of SR. Two new forms of SR, predicted on the basis of LRT and subsequently observed in analogue electronic experiments, are described.",
author = "Mark Dykman and Luchinsky, {D. G.} and R. Mannella and McClintock, {Peter V. E.} and Soskin, {Stanislav M.} and Stein, {N. D.} and Stocks, {N. G.}",
year = "1994",
language = "English",
pages = "275--284",
editor = "Thompson, {J. M. T.} and Bishop, {S. R.}",
booktitle = "Nonlinearity and Chaos in Engineering Dynamics",
publisher = "Wiley",
}
RIS
TY - CHAP
T1 - Stochastic resonance.
AU - Dykman, Mark
AU - Luchinsky, D. G.
AU - Mannella, R.
AU - McClintock, Peter V. E.
AU - Soskin, Stanislav M.
AU - Stein, N. D.
AU - Stocks, N. G.
PY - 1994
Y1 - 1994
N2 - We review stochastic resonance (SR), a counter-intuitive phenomenon in which the signal due to a weak periodic force in a nonlinear system can be enhanced by the addition of external noise. A theoretical approach based on linear response theory (LRn is described. It is pointed out that, although the LRT theory of SR is by definition restricted to the small-signal limit. it possesses substantial advantages in terms of simplicity, generality and predictive power. We outline the application of LRT to overdamped motion in a bistable potential, the most commonly studied form of SR. Two new forms of SR, predicted on the basis of LRT and subsequently observed in analogue electronic experiments, are described.
AB - We review stochastic resonance (SR), a counter-intuitive phenomenon in which the signal due to a weak periodic force in a nonlinear system can be enhanced by the addition of external noise. A theoretical approach based on linear response theory (LRn is described. It is pointed out that, although the LRT theory of SR is by definition restricted to the small-signal limit. it possesses substantial advantages in terms of simplicity, generality and predictive power. We outline the application of LRT to overdamped motion in a bistable potential, the most commonly studied form of SR. Two new forms of SR, predicted on the basis of LRT and subsequently observed in analogue electronic experiments, are described.
M3 - Chapter
SP - 275
EP - 284
BT - Nonlinearity and Chaos in Engineering Dynamics
A2 - Thompson, J. M. T.
A2 - Bishop, S. R.
PB - Wiley
CY - New York
ER -
