Pages that link to "Item:Q2882237"
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The following pages link to A perturbation method for computing the simplest normal forms of dynamical systems (Q2882237):
Displaying 21 items.
- An Upper bound for validity limits of asymptotic analytical approaches based on normal form theory (Q354550) (← links)
- Stability and dynamics of a controlled van der Pol-Duffing oscillator (Q813683) (← links)
- Computation of focus values with applications (Q840394) (← links)
- A canonical model for gradient frequency neural networks (Q979098) (← links)
- Delay induced Hopf bifurcation in a dual model of internet congestion control algorithm (Q1021938) (← links)
- Asymptotic unfoldings of dynamical systems by normalizing beyond the normal form (Q1381631) (← links)
- A matching pursuit technique for computing the simplest normal forms of vector fields (Q1404420) (← links)
- Analysis on double Hopf bifurcation using computer algebra with the aid of multiple scales (Q1597624) (← links)
- Computation of the simplest normal forms with perturbation parameters based on Lie transform and rescaling (Q1612380) (← links)
- Computation of the normal forms for general M-DOF systems using multiple time scales. I: Autonomous systems (Q1776774) (← links)
- Constructing the second order Poincaré map based on the Hopf-zero unfolding method (Q2015330) (← links)
- A direct approach for simplifying nonlinear systems with external periodic excitation using normal forms (Q2023087) (← links)
- Analysis of strongly nonlinear systems by using HBM-AFT method and its comparison with the five-order Runge-Kutta method: application to Duffing oscillator and disc brake model (Q2186969) (← links)
- The simplest normal form and its application to bifurcation control (Q2468193) (← links)
- Control algorithm for creation of Hopf bifurcations in continuous-time systems of arbitrary dimension (Q2478741) (← links)
- The simplest normal form for the singularity of a pure imaginary pair and a zero eigenvalue (Q2731046) (← links)
- An explicit recursive formula for computing the normal form and center manifold of general \(n\)-dimensional differential systems associated with Hopf bifurcations (Q2849230) (← links)
- Computation of normal forms via a perturbation technique (Q2880774) (← links)
- AN EFFICIENT METHOD FOR COMPUTING THE SIMPLEST NORMAL FORMS OF VECTOR FIELDS (Q4653786) (← links)
- (Q4995925) (← links)
- COMPUTATION OF SIMPLEST NORMAL FORMS OF DIFFERENTIAL EQUATIONS ASSOCIATED WITH A DOUBLE-ZERO EIGENVALUE (Q5474195) (← links)
