On the Norm Equivalence of Lyapunov Exponents for Regularizing Linear Evolution Equations
出版年份 2023 全文链接
标题
On the Norm Equivalence of Lyapunov Exponents for Regularizing Linear Evolution Equations
作者
关键词
-
出版物
ARCHIVE FOR RATIONAL MECHANICS AND ANALYSIS
Volume 247, Issue 5, Pages -
出版商
Springer Science and Business Media LLC
发表日期
2023-09-16
DOI
10.1007/s00205-023-01928-y
参考文献
相关参考文献
注意:仅列出部分参考文献,下载原文获取全部文献信息。- Lagrangian chaos and scalar advection in stochastic fluid mechanics
- (2022) Jacob Bedrossian et al. JOURNAL OF THE EUROPEAN MATHEMATICAL SOCIETY
- Well-Separating Common Complements for Sequences of Subspaces of the Same Codimension are Generic in Hilbert Spaces
- (2022) F. Noethen Analysis Mathematica
- A Multiplicative Ergodic Theorem for von Neumann Algebra Valued Cocycles
- (2021) Lewis Bowen et al. COMMUNICATIONS IN MATHEMATICAL PHYSICS
- Stability and collapse of the Lyapunov spectrum for Perron–Frobenius operator cocycles
- (2021) Cecilia González-Tokman et al. JOURNAL OF THE EUROPEAN MATHEMATICAL SOCIETY
- On mix-norms and the rate of decay of correlations
- (2021) Bryan W Oakley et al. NONLINEARITY
- On the Relation between Enhanced Dissipation Timescales and Mixing Rates
- (2019) Michele Coti Zelati et al. COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS
- Dissipation enhancement by mixing
- (2019) Yuanyuan Feng et al. NONLINEARITY
- A spectral approach for quenched limit theorems for random hyperbolic dynamical systems
- (2019) D. Dragiçević et al. TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY
- Diffusion-limited mixing by incompressible flows
- (2018) Christopher J Miles et al. NONLINEARITY
- What are Lyapunov exponents, and why are they interesting?
- (2016) Amie Wilkinson BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY
- Invariant Measures for Passive Scalars in the Small Noise Inviscid Limit
- (2016) Jacob Bedrossian et al. COMMUNICATIONS IN MATHEMATICAL PHYSICS
- Entropy, volume growth and SRB measures for Banach space mappings
- (2016) Alex Blumenthal et al. INVENTIONES MATHEMATICAE
- A volume-based approach to the multiplicative ergodic theorem on Banach spaces
- (2015) Alex Blumenthal DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS
- A concise proof of the multiplicative ergodic theorem on Banach spaces
- (2015) Cecilia González-Tokman et al. Journal of Modern Dynamics
- Stochastic stability of Pollicott–Ruelle resonances
- (2015) Semyon Dyatlov et al. NONLINEARITY
- Averaging and spectral properties for the 2D advection–diffusion equation in the semi-classical limit for vanishing diffusivity
- (2015) J. Vukadinovic et al. PHYSICA D-NONLINEAR PHENOMENA
- A semi-invertible operator Oseledets theorem
- (2013) CECILIA GONZÁLEZ-TOKMAN et al. ERGODIC THEORY AND DYNAMICAL SYSTEMS
- Metastability and rapid convergence to quasi-stationary bar states for the two-dimensional Navier–Stokes equations
- (2013) Margaret Beck et al. PROCEEDINGS OF THE ROYAL SOCIETY OF EDINBURGH SECTION A-MATHEMATICS
- METASTABILITY, LYAPUNOV EXPONENTS, ESCAPE RATES, AND TOPOLOGICAL ENTROPY IN RANDOM DYNAMICAL SYSTEMS
- (2013) GARY FROYLAND et al. Stochastics and Dynamics
- Origin, dynamics and evolution of ocean garbage patches from observed surface drifters
- (2012) Erik van Sebille et al. Environmental Research Letters
- Optimal stirring strategies for passive scalar mixing
- (2011) ZHI LIN et al. JOURNAL OF FLUID MECHANICS
- Diffusion in Fluid Flow: Dissipation Enhancement by Flows in 2D
- (2010) Andrej Zlatoš COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS
- Open problems in the theory of non-uniform hyperbolicity
- (2010) Yakov Pesin et al. DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS
- Coherent sets for nonautonomous dynamical systems
- (2010) Gary Froyland et al. PHYSICA D-NONLINEAR PHENOMENA
- Diffusion and mixing in fluid flow
- (2009) Peter Constantin et al. ANNALS OF MATHEMATICS
Discover Peeref hubs
Discuss science. Find collaborators. Network.
Join a conversationAsk a Question. Answer a Question.
Quickly pose questions to the entire community. Debate answers and get clarity on the most important issues facing researchers.
Get Started