Output variables of dynamic systems subject to random inputs are often quantified by mean-square calculations. Computationally for linear systems, these typically involve integration of the output spectral density over frequency. Numerically, this is a straightforward task and, analytically, methods exist to find mean-square values as functions of transfer function (frequency response) coefficients. These formulations offer analytical relationships between system parameters and mean-square response. This paper develops further analytical relationships in calculating mean-square values as functions of transfer function and state-space properties. Specifically, mean-square response is formulated from (i) system pole-zero locations, (ii) as a spectral decomposition, and (iii) in terms of a system matrix transfer function. Direct, closed-form relationships between response and these properties are afforded. These new analytical representations of the mean-square calculation can provide significant insight into dynamic system response and optimal design/tuning of dynamic systems.

1.
Newland
,
D. E.
, 1993,
Random Vibration and Spectral Analysis
, 2nd ed.,
Longman House
,
New York
.
2.
Redfield
,
R. C.
, and
Karnopp
,
D.
, 1989, “
Performance Sensitivity of an Actively Damped Vehicle Suspension to Feedback Variation
,”
ASME J. Dyn. Syst., Meas., Control
0022-0434,
111
(
1
), pp.
51
60
.
3.
Redfield
,
R. C.
, 1994, “
Random Vibration and the Single Degree-of-Freedom Vibratory System: A Symbolic Quantification of Isolation and Packaging Performance
,”
ASME J. Vibr. Acoust.
0739-3717,
116
(
1
), pp.
1
5
.
4.
Karnopp
,
D.
, 1989, “
Analytical Results for Optimum Actively Damped Suspensions Under Random Excitation
,”
ASME J. Vib., Acoust., Stress, Reliab. Des.
0739-3717,
111
, pp.
278
282
.
5.
James
,
H. M.
,
Nichols
,
N. B.
, and
Phillips
,
R. S.
, 1947,
Theory of Servomechanisms
,
McGraw-Hill
,
New York
,
MIT Radiation Laboratory Series
, Vol.
25
.
6.
Levinson
,
N.
, and
Redheffer
,
R. M.
, 1970,
Complex Variables
,
Holden-Day
,
San Francisco
.
7.
Kailath
,
T.
, 1980,
Linear Systems
,
Prentice-Hall
,
Englewood Cliffs, NJ
.
8.
Horn
,
R. A.
, and
Johnson
,
C. R.
, 1991,
Topics in Matrix Analysis
,
Cambridge University Press
,
Cambridge, England
.
9.
Calvetti
,
D.
,
Gallopoulos
,
E.
, and
Reichel
,
L.
, 1993, “
Accuracy Control for Parallel Evaluation of Matrix Rational Functions
,”
Proc. of 6th SIAM Conference on Parallel Processing for Scientific Computing
,
SIAM
,
Philadelphia
, pp.
652
655
.
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