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引用次数: 1
摘要
微分同态的Katok [Lyapunov]指数、熵和周期点。出版。数学。Inst. Hautes Études Sci. 51(1980), 137-173]推测黎曼流形上的每一个$C^{2}$微分同态f具有中间熵性质,即对于任意常数$C \in [0, h_{\ mathm}}(f))$,存在一个满足$h_{\mu}(f)= C $的遍历测度$\mu $。在本文中,我们得到了基本流集的一个条件中间度量熵性质和两个条件中间Birkhoff平均性质,这些性质表征了遍历测度在不变测度中的精细作用。在此过程中,我们建立了一个“多马蹄形”熵密性质,并结合条件变分原理利用它得到目标。对于奇异双曲吸引子,我们也得到了相同的结果。
Conditional intermediate entropy and Birkhoff average properties of hyperbolic flows
Abstract Katok [Lyapunov exponents, entropy and periodic points of diffeomorphisms. Publ. Math. Inst. Hautes Études Sci. 51 (1980), 137–173] conjectured that every $C^{2}$ diffeomorphism f on a Riemannian manifold has the intermediate entropy property, that is, for any constant $c \in [0, h_{\mathrm {top}}(f))$ , there exists an ergodic measure $\mu $ of f satisfying $h_{\mu }(f)=c$ . In this paper, we obtain a conditional intermediate metric entropy property and two conditional intermediate Birkhoff average properties for basic sets of flows that characterize the refined roles of ergodic measures in the invariant ones. In this process, we establish a ‘multi-horseshoe’ entropy-dense property and use it to get the goal combined with conditional variational principles. We also obtain the same result for singular hyperbolic attractors.
期刊介绍:
Ergodic Theory and Dynamical Systems focuses on a rich variety of research areas which, although diverse, employ as common themes global dynamical methods. The journal provides a focus for this important and flourishing area of mathematics and brings together many major contributions in the field. The journal acts as a forum for central problems of dynamical systems and of interactions of dynamical systems with areas such as differential geometry, number theory, operator algebras, celestial and statistical mechanics, and biology.
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