Typical Singularities of Polymorphisms Generated by the Problem of Destruction of an Adiabatic Invariant

    2012, Volume 17, Number 2, pp.  122-130

    Author(s): Golubtsov P. E.

    Polymorphisms are a class of multivalued measure-preserving self-maps of Lebesgue spaces. Specifically, polymorphisms can be used to describe the change in the adiabatic invariant due to separatrix crossing. In this case, it consists of smooth functions mapping the unit interval into itself. In addition, there are some conditions these functions must satisfy in a typical case, namely, that their endpoints form rigid structures that persist under small perturbations. Here we will describe these conditions.
    Keywords: adiabatic invariant, adiabatic approximation, polymorphisms, typical singularities
    Citation: Golubtsov P. E., Typical Singularities of Polymorphisms Generated by the Problem of Destruction of an Adiabatic Invariant, Regular and Chaotic Dynamics, 2012, Volume 17, Number 2, pp. 122-130



    Access to the full text on the Springer website