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Joint Meeting of AMS, DMV, and ÖMG
June 16-19, 2005
Johannes Gutenberg University
Mainz, Germany

Organizers
Volker Bach, Mainz; Klaus D. Bierstedt, DMV; Susan Friedlander, Associate Secretary, AMS

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Experimental Results for the Poincaré Center Problem
by
Hans-Christian Graf v. Bothmer
Universität Hannover
Coauthors: Martin Cremer

In 1885 Poincaré asked when the differential equation
.
y
 
 = - x + p(x, y)
y+q(x, y)
has stable solutions in the neighbourhood of the equilibrium solution (x, y)=(0, 0). He showed that for p and q polynomials of fixed degree the variety X of such differential equations is algebraic, by giving an infinite generating system of polynomial equations.

For p and q homogeneous of degree 2 the variety X has been described geometrically by various autors (Dulac 1908, Frommer 1933, ..., Schlomiuk 1993). In this talk these results are reviewed and some new results for the case p and q inhomogenous of degree 3 are obtained. The methods used are reduction to finite characteristic, computer algebra and syzygies.

Date received: March 30, 2005

Copyright © 2005 by the author(s). The author(s) of this document and the organizers of the conference have granted their consent to include this abstract in Atlas Mathematical Conference Abstracts. Document # caqm-82.