Takeuchi Kazumasa A, Yang Hong-liu, Ginelli Francesco, Radons Günter, Chaté Hugues
Service de Physique de l'État Condensé, CEA-Saclay, F-91191 Gif-sur-Yvette, France.
Phys Rev E Stat Nonlin Soft Matter Phys. 2011 Oct;84(4 Pt 2):046214. doi: 10.1103/PhysRevE.84.046214. Epub 2011 Oct 25.
We show, using covariant Lyapunov vectors, that the tangent space of spatially extended dissipative systems is split into two hyperbolically decoupled subspaces: one comprising a finite number of frequently entangled "physical" modes, which carry the physically relevant information of the trajectory, and a residual set of strongly decaying "spurious" modes. The decoupling of the physical and spurious subspaces is defined by the absence of tangencies between them and found to take place generally; we find evidence in partial differential equations in one and two spatial dimensions and even in lattices of coupled maps or oscillators. We conjecture that the physical modes may constitute a local linear description of the inertial manifold at any point in the global attractor.
我们利用协变李雅普诺夫向量表明,空间扩展耗散系统的切空间被分裂为两个双曲解耦子空间:一个包含有限数量的频繁纠缠的“物理”模式,这些模式携带轨迹的物理相关信息,以及一组强衰减的“虚假”模式的剩余集。物理子空间和虚假子空间的解耦是由它们之间不存在相切性来定义的,并且发现这种情况普遍发生;我们在一维和二维的偏微分方程中,甚至在耦合映射或振子的晶格中都找到了证据。我们推测,物理模式可能构成全局吸引子中任意点处惯性流形的局部线性描述。
