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引用次数: 0
摘要
描述周期轨道的存在与否是一个经典问题,它既有重要的理论意义,又有许多实际应用。在此,我们得到了平面动力系统 \(\dot{x}=y,~\dot{y}=-g(x)-f(x,y)y\) 周期轨道不存在的几个新判据,并通过实例证明了这些判据是适用的,而已知判据对其无效。根据这些判据,我们进一步描述了其均衡的局部拓扑结构,这也表明安德烈耶夫(Am Math Soc Transl 8:183-207, 1958)关于退化均衡的局部拓扑分类的一个经典结果是不完整的。最后,作为这些结果的另一个应用,我们对平面微分系统的全局相位肖像进行了分类,该系统来自 A. Gasull 提出的 33 个问题中的第三个问题,也来自对其参数进行适当限制的机械振荡器。
New Criterions on Nonexistence of Periodic Orbits of Planar Dynamical Systems and Their Applications
Characterizing existence or not of periodic orbit is a classical problem, and it has both theoretical importance and many real applications. Here, several new criterions on nonexistence of periodic orbits of the planar dynamical system \(\dot{x}=y,~\dot{y}=-g(x)-f(x,y)y\) are obtained and by examples shows that these criterions are applicable, but the known ones are invalid to them. Based on these criterions, we further characterize the local topological structures of its equilibrium, which also show that one of the classical results by Andreev (Am Math Soc Transl 8:183–207, 1958) on local topological classification of the degenerate equilibrium is incomplete. Finally, as another application of these results, we classify the global phase portraits of a planar differential system, which comes from the third question in the list of the 33 questions posed by A. Gasull and also from a mechanical oscillator under suitable restriction to its parameters.
期刊介绍:
The mission of the Journal of Nonlinear Science is to publish papers that augment the fundamental ways we describe, model, and predict nonlinear phenomena. Papers should make an original contribution to at least one technical area and should in addition illuminate issues beyond that area''s boundaries. Even excellent papers in a narrow field of interest are not appropriate for the journal. Papers can be oriented toward theory, experimentation, algorithms, numerical simulations, or applications as long as the work is creative and sound. Excessively theoretical work in which the application to natural phenomena is not apparent (at least through similar techniques) or in which the development of fundamental methodologies is not present is probably not appropriate. In turn, papers oriented toward experimentation, numerical simulations, or applications must not simply report results without an indication of what a theoretical explanation might be.
All papers should be submitted in English and must meet common standards of usage and grammar. In addition, because ours is a multidisciplinary subject, at minimum the introduction to the paper should be readable to a broad range of scientists and not only to specialists in the subject area. The scientific importance of the paper and its conclusions should be made clear in the introduction-this means that not only should the problem you study be presented, but its historical background, its relevance to science and technology, the specific phenomena it can be used to describe or investigate, and the outstanding open issues related to it should be explained. Failure to achieve this could disqualify the paper.