A new method to describe hyperbolic patterns in two-dimensional flows is proposed. The method is based on the Covariant Lyapunov Vectors (CLVs), which have the properties of being covariant with the dynamics, and thus, being mapped by the tangent linear operator into another CLVs basis, they are norm independent, invariant under time reversal and cannot be orthonormal. CLVs can thus give more detailed information about the expansion and contraction directions of the flow than the Lyapunov vector bases, which are instead always orthogonal. We suggest a definition of Hyperbolic Covariant Coherent Structures (HCCSs), which can be defined on the scalar field representing the angle between the CLVs. HCCSs can be defined for every time instant an...
The finite-time Lyapunov exponent (FTLE) field can be used for many purposes, from the analysis of t...
Though dynamical systems are a popular area of research these days, previous methods have dealt poor...
In general the term "Lagrangian coherent structure" (LCS) is used to make reference about structures...
A new method to describe hyperbolic patterns in two-dimensional flows is proposed. The method is bas...
This paper develops the theory and computation of Lagrangian Coherent Structures (LCS), which are de...
Lyapunov exponents are well-known characteristic numbers that describe growth rates of perturbations...
AbstractWe study a hyperbolic/non-hyperbolic transition of the flows on two-dimensional torus govern...
Recent years have witnessed a growing interest in covariant Lyapunov vectors (CLVs) as an important ...
Recent years have witnessed a growing interest in covariant Lyapunov vectors (CLVs) which span local...
Numerical simulations and experimental observations reveal that unsteady fluid systems can be divide...
International audienceThis paper discusses the application of Lyapunov theory in chaotic systems to ...
Hyperbolic Lagrangian Coherent Structures (LCSs) are locally most repelling or most at-tracting mate...
In this thesis the Lyapunov analysis, as applied to the chaotic dynamics of quasi one dimensional ha...
A generic flow system can be described as a system whose state depends on flowing streams of energy,...
The finite-time Lyapunov exponent (FTLE) field can be used for many purposes, from the analysis of t...
Though dynamical systems are a popular area of research these days, previous methods have dealt poor...
In general the term "Lagrangian coherent structure" (LCS) is used to make reference about structures...
A new method to describe hyperbolic patterns in two-dimensional flows is proposed. The method is bas...
This paper develops the theory and computation of Lagrangian Coherent Structures (LCS), which are de...
Lyapunov exponents are well-known characteristic numbers that describe growth rates of perturbations...
AbstractWe study a hyperbolic/non-hyperbolic transition of the flows on two-dimensional torus govern...
Recent years have witnessed a growing interest in covariant Lyapunov vectors (CLVs) as an important ...
Recent years have witnessed a growing interest in covariant Lyapunov vectors (CLVs) which span local...
Numerical simulations and experimental observations reveal that unsteady fluid systems can be divide...
International audienceThis paper discusses the application of Lyapunov theory in chaotic systems to ...
Hyperbolic Lagrangian Coherent Structures (LCSs) are locally most repelling or most at-tracting mate...
In this thesis the Lyapunov analysis, as applied to the chaotic dynamics of quasi one dimensional ha...
A generic flow system can be described as a system whose state depends on flowing streams of energy,...
The finite-time Lyapunov exponent (FTLE) field can be used for many purposes, from the analysis of t...
Though dynamical systems are a popular area of research these days, previous methods have dealt poor...
In general the term "Lagrangian coherent structure" (LCS) is used to make reference about structures...