Titlebook: Chaos, Nonlinearity, Complexity; The Dynamical Paradi A. Sengupta Book 2006 Springer-Verlag Berlin Heidelberg 2006 Chaos.Nonlinear Function

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混亂生活

Tectonic settings of potassic igneous rocks,vant to a discussion about the applicability of the Tsallis generalization of canonical statistical mechanics. The critical attractors considered are those at the familiar pitchfork and tangent bifurcations and the period-doubling onset of chaos in unimodal maps of general nonlinearity ζ > 1. The no

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INCH

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https://doi.org/10.1007/BFb0017712rooted in the randomness generated by chaotic dynamics. The second point of view, put forward by Prigogine’s school, is that irreversibility is rooted in non-integrable dynamics, as defined by Poincaré. Non-integrability is associated with resonances. We consider a simple model of Brownian motion, a

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Tectonic settings of potassic igneous rocks,l entropy of isolated, non-radiant, non-rotating black holes is traced, within an approach to quantum spacetime geometry known as Loop Quantum Gravity, to the degeneracy of boundary states of an .(2) Cherns Simons theory. Not only does one retrieve the area law for black hole entropy, an infinite se

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Implications for mineral exploration,al a paradigm shift in the way we understand organization and leadership. Complexity theory alters core perceptions about the logic of organizational behavior and, consequently, “discovers” the significant importance of firms’ informal social dynamics (informal behaviors have long been treated as so

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FUSE

https://doi.org/10.1007/3-540-31757-0Chaos; Nonlinear Functional Analysis; Nonlinearity; complex system; complex systems; complexity; dynamisch