Infinitesimally Stable and Unstable Singularities of 2-Degrees of Freedom Completely Integrable Systems

    2007, Volume 12, Number 6, pp.  717-731

    Author(s): Giacobbe A.

    In this article we give a list of 10 rank zero and 6 rank one singularities of 2-degrees of freedom completely integrable systems. Among such singularities, 14 are the singularities that satisfy a non-vanishing condition on the quadratic part, the remaining 2 are rank 1 singularities that play a role in the geometry of completely integrable systems with fractional monodromy. We describe which of them are stable and which are unstable under infinitesimal completely integrable deformations of the system.
    Keywords: singularities, completely integrable systems, bifurcation diagrams, infinitesimal deformations, cusps, local normal forms
    Citation: Giacobbe A., Infinitesimally Stable and Unstable Singularities of 2-Degrees of Freedom Completely Integrable Systems, Regular and Chaotic Dynamics, 2007, Volume 12, Number 6, pp. 717-731



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