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RESEARCH PRODUCT
Normalizability, Synchronicity, and Relative Exactness for Vector Fields in C2
Colin ChristopherChristiane RousseauPavao Mardešićsubject
Numerical AnalysisControl and OptimizationAlgebra and Number TheorySolenoidal vector fieldMultiplicative functionMathematical analysisType (model theory)FoliationTransformation (function)Control and Systems EngineeringVector fieldSaddleMathematicsVector potentialdescription
In this paper, we study the necessary and su.cient condition under which an orbitally normalizable vector field of saddle or saddle-node type in C2 is analytically conjugate to its formal normal form (i.e., normalizable) by a transformation fixing the leaves of the foliation locally. First, we express this condition in terms of the relative exactness of a certain 1-form derived from comparing the time-form of the vector field with the time-form of the normal form. Then we show that this condition is equivalent to a synchronicity condition: the vanishing of the integral of this 1-form along certain asymptotic cycles de.ned by the vector field. This can be seen as a generalization of the classical Poincare theorem saying that a center is isochronous (i.e., synchronous to the linear center) if and only if it is linearizable. The results, in fact, allow us in many cases to compare any two vector fields which differ by a multiplicative factor. In these cases we show that the two vector fields are analytically conjugate by a transformation fixing the leaves of the foliation locally if and only if their time-forms are synchronous.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2004-10-01 | Journal of Dynamical and Control Systems |