Bifurcations and finiteness problems in Ordinary Differential Equations [ Back ]

17.02.20 - 21.02.20
Bellaterra, Spain
P. De Maesschalck, D. Rojas, J. Torregrosa, and J. Villadelprat
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The purpose of this workshop is to provide an adequate atmosphere to discuss the recent developments around the Hilbert’s 16th and related problems, as well as to stimulate new research. The topics to be discussed include (but are not restricted to) desingularization of parametrized families, asymptotic expansions of time and return maps, blowing-up and normal forms of singularities, ideal of coefficients associated with an analytic unfolding, abelian integrals, Chebyshev systems, singular perturbations problems occurring in planar slow-fast systems, etc. It is aimed also to bring together methods from real and complex dynamical systems because the interplay between real and complex methods has been proved to be both useful and necessary for the solution of many interesting problems.



Claudio Buzzi (Universidade Estadual Paulista)
Colin Christopher (Plymouth University)
Peter De Maesschalck (Hasselt University)
Armengol Gasull (Universitat Autònoma de Barcelona)
Pavao Mardesic (Université de Bourgogne)
Douglas Novaes (Universidade Estadual de Campinas)
Dimitry Novikov (Weizmann institute of Science)
Daniel Panazzolo (Université de Haute-Alsace)
Rafel Prohens     Universitat de les Illes Balears)
Salomon Rebollo (Universidad del Bio Bio)
Robert Roussarie (Université de Bourgogne)
Xiang Zhang (Shanghai Jiao Tong University)


This Workshop is part of the Intensive Research Program LOW DIMENSIONAL DYNAMICAL SYSTEMS AND APPLICATIONS at Centre de Recerca Matemàtica from February to April 2020.