In a recent paper an asymptotic approximation for the moment Lyapunov exponent, of two coupled oscillators driven by a small intensity real noise was obtained. The utility of that result is limited by the fact that it was obtained under the assumption that the moment p is small, a limitation which precludes, for example, the determination of the stability index. In this paper that limitation is removed and an asymptotic approximation valid for arbitrary p is obtained. The results are applied to study the moment stability of the stationary solutions of structural and mechanical systems subjected to stochastic excitation.
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Technical Papers
1.
Molcˇanov
, S. A.
, 1978
, “The Structure of Eigenfunctions of One-Dimensional Unordered Structures
,” Math. USSR Izvestija
, 12
, No. 1
, pp. 69
–101
.2.
Arnold
, L.
, 1984
, “A Formula Connecting Sample and Moment Stability of Linear Stochastic Systems
,” SIAM (Soc. Ind. Appl. Math.) J. Appl. Math.
, 44
, No. 4
, pp. 793
–802
.3.
Arnold, L., Kliemann, W., and Oeljeklaus, E., 1986, Lyapunov Exponents of Linear Stochastic Systems, Vol. 1186 (Lecture Notes in Mathematics), Springer-Verlag, New York, pp. 85–125.
4.
Arnold, L., Oeljeklaus, E., and Pardoux, E., 1986, Almost Sure and Moment Stability for Linear Ito^ Equations, Vol. 1186 (Lecture Notes in Mathematics), Springer-Verlag, New York, pp. 129–159.
5.
Namachchivaya
, N. Sri
, Van Roessel
, H. J.
, and Doyle
, M. M.
, 1996
, “Moment Lyapunov Exponent for Two Coupled Oscillators Driven by Real Noise
,” SIAM (Soc. Ind. Appl. Math.) J. Appl. Math.
, 56
, pp. 1400
–1423
.6.
Khas’minskii
, R. Z.
, and Moshchuk
, N.
, 1998
, “Moment Lyaponov Exponent and Stability Index for Linear Conservative System With Small Random Perturbation
,” SIAM (Soc. Ind. Appl. Math.) J. Appl. Math.
, 58
, No. 1
, pp. 245
–256
.7.
Arnold
, L.
, Doyle
, M. M.
, and Namachchivaya
, N. Sri
, 1997
, “Small Noise Expansion of Moment Lyapunov Exponents for General Two Dimensional Systems
,” Dyn. Stab. Syst.
, 12
, No. 3
, pp. 187
–211
.8.
Pardoux
, E.
, and Wihstutz
, V.
, 1988
, “Lyapunov Exponent and Rotation Number of Two-Dimensional Linear Stochastic Systems With Small Diffusion
,” SIAM (Soc. Ind. Appl. Math.) J. Appl. Math.
, 48
, No. 2
, pp. 442
–457
.9.
Namachchivaya
, N. Sri
, and Van Roessel
, H. J.
, 1993
, “Maximal Lyapunov Exponent and Rotation Numbers for Two Coupled Oscillators Driven by Real Noise
,” J. Stat. Phys.
, 71
, No. 3/4
, pp. 549
–567
.10.
Khas’minskii
, R. Z.
, 1966
, “A Limit Theorem for Solutions of Differential Equations With Random Right-Hand-Side
,” Theor. Probab. Appl.
, 11
, No. 3
, pp. 390
–406
.11.
Wedig, W. V., 1988, “Lyapunov Exponents of Stochastic Systems and Related Bifurcation Problems,” Stochastic Structural Dynamics: Progress in Theory and Applications, S. T. Ariaratnam, G. I. Schue¨ller, and I. Elishakoff, eds., Elsevier, London.
12.
Bolotin, V. V., 1964, The Dynamic Stability of Elastic Systems, Holden-Day, San Francisco.
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