论文信息 - NUMERICAL NORMALIZATION TECHNIQUES FOR ALL CODIM 2 BIFURCATIONS OF EQUILIBRIA IN ODE'S

NUMERICAL NORMALIZATION TECHNIQUES FOR ALL CODIM 2 BIFURCATIONS OF EQUILIBRIA IN ODE'S

Explicit computational formulas for the coecients of the normal forms for all codim 2 equilibrium bifurcations of equilibria in autonomous ODEs are derived. They include second-order coecients for the Bogdanov{Takens bifurcation, third-order coecients for the cusp and fold-Hopf bifurcations, and coecients of the fth-order terms for the generalized Hopf (Bautin) and double Hopf bifurcations. The formulas are independent on the dimension of the phase space and involve only critical eigenvectors of the Jacobian matrix of the right-hand sides and its transpose, as well as multilinear functions from the Taylor expansion of the right-hand sides at the critical equilibrium. The normal form coecients for the fold-Hopf bifurcation in the \new" Lorenz model are computed using the derived formulas, proving the existence of a nontrivial invariant set in the system.

Siam J. Numer

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