Add to ORKGWe observe that high-stretch tails of finite-time Lyapunov exponent distributions associated with interfaces evolving under a class of nonturbulent chaotic flows can range from essentially Gaussian tails to nearly exponential tails, and show that the non-Gaussian deviations can have a significant effect on interfacial evolution. This observation motivates new insight into stretch processes under chaotic flows
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We analyze the exponent characterizing the decay towards the equilibrium distribution of a generic d...
We study the statistical fluctuations of Lyapunov exponents in the discrete version of the non-integ...
We observe that high-stretch tails of finite-time Lyapunov exponent distributions associated with in...
In intermittent dynamical systems, the distributions of local Lyapunov expo-nents are markedly non-G...
In intermittent dynamical systems, the distributions of local Lyapunov exponents are markedly non-Ga...
We present a method to quantify kinematic stretching in incompressible, unsteady, isoviscous, three-...
We study the probability densities of finite-time or local Lyapunov exponents in low-dimensional cha...
The Kuramoto-Sivashinsky equation which describes fluid interfaces in several physical contexts is k...
© 2015 American Physical Society. We investigate the relaxation of long-tailed distributions under s...
The simulation of planar elongational flow in a nonequilibrium steady state for arbitrarily long tim...
The present note deals with large time properties of the Lagrangian trajectories of a turbulent flow...
This article shows numerically that the variance of the stretching exponents for two-dimensional cha...
The simulation of atoms and molecules under planar elongational flow in a nonequilibrium steady stat...
WOS: 000333513500003We numerically introduce the relationships among correlation, fractality, Lyapun...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We analyze the exponent characterizing the decay towards the equilibrium distribution of a generic d...
We study the statistical fluctuations of Lyapunov exponents in the discrete version of the non-integ...
We observe that high-stretch tails of finite-time Lyapunov exponent distributions associated with in...
In intermittent dynamical systems, the distributions of local Lyapunov expo-nents are markedly non-G...
In intermittent dynamical systems, the distributions of local Lyapunov exponents are markedly non-Ga...
We present a method to quantify kinematic stretching in incompressible, unsteady, isoviscous, three-...
We study the probability densities of finite-time or local Lyapunov exponents in low-dimensional cha...
The Kuramoto-Sivashinsky equation which describes fluid interfaces in several physical contexts is k...
© 2015 American Physical Society. We investigate the relaxation of long-tailed distributions under s...
The simulation of planar elongational flow in a nonequilibrium steady state for arbitrarily long tim...
The present note deals with large time properties of the Lagrangian trajectories of a turbulent flow...
This article shows numerically that the variance of the stretching exponents for two-dimensional cha...
The simulation of atoms and molecules under planar elongational flow in a nonequilibrium steady stat...
WOS: 000333513500003We numerically introduce the relationships among correlation, fractality, Lyapun...
Interfaces are created to separate two distinct phases in a situation in which phase coexistence occ...
We analyze the exponent characterizing the decay towards the equilibrium distribution of a generic d...
We study the statistical fluctuations of Lyapunov exponents in the discrete version of the non-integ...