Please use this identifier to cite or link to this item: http://hdl.handle.net/1942/1562
Title: Algebraic curves of maximal cyclicity
Authors: CAUBERGH, Magdalena 
DUMORTIER, Freddy 
Issue Date: 2006
Publisher: Cambridge Philosophical Society
Source: MATHEMATICAL PROCEEDINGS OF THE CAMBRIDGE PHILOSOPHICAL SOCIETY, 140. p. 47-70
Abstract: The paper deals with analytic families of planar vector fields, studying methods to detect the cyclicity of a non-isolated closed orbit, i.e. the maximum number of limit cycles that can locally bifurcate from it. It is known that this multi-parameter problem can be reduced to a single-parameter one, in the sense that there exist analytic curves in parameter space along which the maximal cyclicity can be attained. In that case one speaks about a maximal cyclicity curve (nice) in case only the number is considered and of a maximal multiplicity curve (mine) in case the multiplicity is also taken into account. In view of obtaining efficient algorithms for detecting the cyclicity, we investigate whether such nice or mine can be algebraic or even linear depending on certain general properties of the families or of their associated Bautin ideal. In any case by well chosen examples we show that prudence is appropriate.
Document URI: http://hdl.handle.net/1942/1562
ISSN: 0305-0041
e-ISSN: 1469-8064
DOI: 10.1017/S0305004105008807
ISI #: 000234946200004
Category: A1
Type: Journal Contribution
Validations: ecoom 2007
Appears in Collections:Research publications

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