A frequency-domain approach to the analysis of stability and bifurcations in nonlinear systems described by differential-algebraic equations

International Journal of Circuit Theory and Applications

Volumn 36, Issue 4, 2008, Pages 421-439

  Traversa, F L ^a   Bonani, F ^a   Guerrieri, S Donati ^a  

^a POLITECNICO DI TORINO   (Italy)

Author keywords

Bifurcation; Harmonic balance; Nonlinear systems; Stability

Indexed keywords

BIFURCATION (MATHEMATICS); BOOLEAN ALGEBRA; CONTROL NONLINEARITIES; CONTROL THEORY; CONVERGENCE OF NUMERICAL METHODS; DELTA SIGMA MODULATION; DIFFERENCE EQUATIONS; DIFFERENTIAL EQUATIONS; DIFFERENTIATION (CALCULUS); EQUATIONS OF STATE; FREQUENCY DOMAIN ANALYSIS; HYSTERESIS MOTORS; ITERATIVE METHODS; MATRIX ALGEBRA; MILITARY DATA PROCESSING; NONLINEAR SYSTEMS; NUMERICAL METHODS; ORDINARY DIFFERENTIAL EQUATIONS; OSCILLATORS (ELECTRONIC); SOLUTIONS; SYSTEM STABILITY;

ANALYSIS OF STABILITY; AUTONOMOUS NONLINEAR SYSTEMS; BIFURCATION CURVES; CHUA'S CIRCUITS; COLPITTS' OSCILLATORS; CUBIC NON LINEARITIES; DIFFERENTIAL ALGEBRAIC EQUATION (DAE); FREQUENCY DOMAIN APPROACHES; HARMONIC BALANCE (HB) TECHNIQUES; JACOBIAN; LIMIT CYCLING; NUMERICAL SOLUTIONS; PERIODIC SOLUTIONS; PERIODIC STEADY STATE;

NONLINEAR EQUATIONS;

EID: 47749106038     PISSN: 00989886     EISSN: 1097007X     Source Type: Journal    
DOI: 10.1002/cta.440     Document Type: Article

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