A polynomial system of differential equations on the plane with a singularity at which the eigenvalues of the linear part are complex can be placed, by means of an affine transformation and a rescaling of time, in the form x = λx - y + P(x, y), y = x + λy + Q(x, y). The problem of determining, when λ = 0, whether the origin is a spiral focus or a center dates back to Poincaré. This is the center problem. We discuss an approach to this problem that uses methods of computational commutative algebra. We treat generalizations of the center problem to the complex setting and to higher dimensions. The theory developed also has bearing on the cyclicity problem at the origin, the problem of determining bounds on the number of isolated periodic orbits that can bifurcate from the origin under small perturbation of the coefficients of the original system. We also treat this application of the theory. Some attention is also devoted to periodic solutions on center manifolds and their bifurcations.
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机译:上与一个奇点在该直线部分的本征值是复杂平面微分方程的多项式系统可以放置,通过仿射变换和时间的重新缩放的装置,其形式为X =λx - Y + P(X ,y)时,Y = X +λy+ Q(X,Y)。确定,λ= 0时,原点是否是螺旋焦点或中心可以追溯到庞加莱的问题。这是中心问题。我们讨论的方法解决这个问题是计算交换代数的用途方法。我们将中心问题的概括到复杂的设置和更高的维度。还开发了理论原点,确定在可以从原点下的原系统系数的微小扰动分叉隔离周期轨道的数量界限的问题,轴承的周期性问题。我们也把这个理论应用。一些关注还专门在中心歧管和其分支周期解。
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