A THEORETICAL JUSTIFICATION OF THE METHOD OF HARMONIC BALANCE FOR SYSTEMS WITH DISCONTINUITIES

A THEORETICAL JUSTIFICATION OF THE METHOD OF HARMONIC BALANCE FOR SYSTEMS WITH DISCONTINUITIES

We prove a theorem which provides a rigorous justification of an intuitive method used by electrical engineers to predict the presence or absence of periodic oscillations in nonlinear systems. Although the literature contains some excellent discussions of the conditions under which the method can be...

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Veröffentlicht in:The Rocky Mountain journal of mathematics 1990, Vol.20 (4), p.1079-1098
Hauptverfasser: MACKI, JACK W., NISTRI, PAOLO, ZECCA, PIETRO
Format: Artikel
Sprache:eng
Schlagworte:
Approximation
Continuous functions
differential inclusion
Electrical engineering
Epistemic justification
Equations
harmonic balance
Mathematical discontinuity
Mathematical functions
Periodic solution
Scalars
Vector fields
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Zusammenfassung:We prove a theorem which provides a rigorous justification of an intuitive method used by electrical engineers to predict the presence or absence of periodic oscillations in nonlinear systems. Although the literature contains some excellent discussions of the conditions under which the method can be rigorously justified, there are some oversights and there is lacking a completely detailed treatment, particularly for unforced discontinuous systems. By applying the theory of topological degree for differential inclusions, we are able to present a unified rigorous justification in full detail, and we can illustrate how our abstract hypotheses match up, point by point, with the standard hypotheses used by engineers.
ISSN:0035-7596
1945-3795
DOI:10.1216/rmjm/1181073064