Some strongly nonlinear conservative oscillators, on slight perturbation, can be studied via averaging of elliptic functions. These and many other oscillations allow harmonic balance-based averaging (HBBA), recently developed as an approximate first-order calculation. Here, we extend HBBA to higher orders. Unlike the usual higher-order averaging for weakly nonlinear oscillations, here both the dynamic variable and time are averaged with respect to an auxiliary variable. Since the harmonic balance approximations introduce technically O(1) errors at each order, the higher-order results are not strictly asymptotic. Nevertheless, as we show with examples, for reasonable values of the small expansion parameter, excellent approximations are obtained.

1.
Mickens
,
R. E.
, 1986, “
A Generalisation of the Method of Harmonic Balance
,”
J. Sound Vib.
0022-460X
111
(
3
), pp.
515
518
.
2.
Cap
,
F.
, 1974, “
Averaging Method for the Solution of Nonlinear Differential Equations With Periodic Non-Harmonic Solutions
,”
Int. J. Non-Linear Mech.
0020-7462
9
, pp.
441
450
.
3.
Yuste
,
S. B.
, and
Bejarano
,
J. D.
, 1990, “
Improvement of a Krylov-Bogoliubov Method That Uses Jacobi Elliptic Functions
,”
J. Sound Vib.
0022-460X
139
(
1
), pp.
151
163
.
4.
Barkham
,
P. G. D.
, and
Soudack
,
A. C.
, 1969, “
An Extension of the Method of Krylov and Bogoliubov
,”
Int. J. Control
0020-7179
10
(
4
), pp.
377
392
.
5.
Coppola
,
V. T.
, and
Rand
,
R. H.
, 1990, “
Averaging Using Elliptic Functions: Approximations of Limit Cycles
,”
Acta Mech.
0001-5970
81
, pp.
125
142
.
6.
Xu
,
Z.
, and
Cheung
,
Y. K.
, 1994, “
Averaging Using Generalized Harmonic Functions for Strongly Nonlinear Oscillators
,”
J. Sound Vib.
0022-460X
174
(
4
), pp.
563
576
.
7.
Cheung
,
Y. K.
, and
Xu
,
Z.
, 1995, “
Internal Resonance of Strongly Nonlinear Autonomous Vibrating Systems With Many Degrees of Freedom
,”
J. Sound Vib.
0022-460X
180
(
2
), pp.
229
238
.
8.
Mahmoud
,
G. M.
, 1993, “
On the Generalized Averaging Method of a Class of Strongly Nonlinear Forced Oscillators
,”
Physica A
0378-4371
199
, pp.
87
95
.
9.
Chatterjee
,
A.
, 2003, “
Harmonic Balance Based Averaging: Approximate Realizations of an Asymptotic Technique
,”
Nonlinear Dyn.
0924-090X
32
, pp.
323
343
.
10.
Das
,
S. L.
, and
Chatterjee
,
A.
, 2003, “
Multiple Scales via Galerkin Projections: Approximate Asymptotics for Strongly Nonlinear Oscillations
,”
Nonlinear Dyn.
0924-090X
32
, pp.
161
186
.
11.
Abraham
,
G. T.
, and
Chatterjee
,
A.
, 2003, “
Approximate Asymptotics for a Nonlinear Mathieu Equation Using Harmonic Balance Based Averaging
,”
Nonlinear Dyn.
0924-090X
31
, pp.
347
365
.
12.
Rand
,
R. H.
, 2003, “
Lecture Notes on Nonlinear Vibrations
,” Version 45, available online at http://www.tam.cornell.edu/randdocs/http://www.tam.cornell.edu/randdocs/
13.
Verhulst
,
F.
, 1990, “
Nonlinear Differential Equations and Dynamical Systems
,”
Springer-Verlag
, New York.
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