We investigate the geometrical structure of instabilities in the two-scale Lorenz 96 model through the prism of Lyapunov analysis. Our detailed study of the full spectrum of covariant Lyapunov vectors reveals the presence of a slow bundle in tangent space, composed by a set of vectors with a significant projection onto the slow degrees of freedom; they correspond to the smallest (in absolute value) Lyapunov exponents and thereby to the longer timescales. We show that the dimension of the slow bundle is extensive in the number of both slow and fast degrees of freedom and discuss its relationship with the results of a finite-size analysis of instabilities, supporting the conjecture that the slow-variable behavior is effectively determined by ...
International audienceWe study in detail the role of covariant Lyapunov vectors and their respective...
This is the final version. Available from European Geosciences Union via the DOI in this record.The ...
One of the most relevant weather regimes in the midlatitude atmosphere is the persistent deviation f...
Data availability: All data have been generated by numerically integrating the model equations menti...
We investigate the geometrical structure of instabilities in the two-scale Lorenz 96 model through t...
We investigate the geometrical structure of instabilities in the two-scale Lorenz 96 model through t...
We study a simplified coupled atmosphere-ocean model using the formalism of covariant Lyapunov vecto...
The stability properties of intermediate-order climate models are investigated by computing their L...
We study the dynamics of systems with different timescales, when access only to the slow variables i...
It is well known that the predictability of weather and climate is strongly state-dependent. Special...
This study investigates the use of covariant Lyapunov vectors and their respective angles for detect...
Abstract: In chaotic dynamical systems such as the weather, prediction errors grow faster in some ...
The present work aims to apply a recently proposed method for estimating Lyapunov exponents to chara...
Starting from the classical Saltzman two-dimensional convection equations, we derive via a severe sp...
International audienceWe test a simple technique based on breeding to separate fast and slow unstabl...
International audienceWe study in detail the role of covariant Lyapunov vectors and their respective...
This is the final version. Available from European Geosciences Union via the DOI in this record.The ...
One of the most relevant weather regimes in the midlatitude atmosphere is the persistent deviation f...
Data availability: All data have been generated by numerically integrating the model equations menti...
We investigate the geometrical structure of instabilities in the two-scale Lorenz 96 model through t...
We investigate the geometrical structure of instabilities in the two-scale Lorenz 96 model through t...
We study a simplified coupled atmosphere-ocean model using the formalism of covariant Lyapunov vecto...
The stability properties of intermediate-order climate models are investigated by computing their L...
We study the dynamics of systems with different timescales, when access only to the slow variables i...
It is well known that the predictability of weather and climate is strongly state-dependent. Special...
This study investigates the use of covariant Lyapunov vectors and their respective angles for detect...
Abstract: In chaotic dynamical systems such as the weather, prediction errors grow faster in some ...
The present work aims to apply a recently proposed method for estimating Lyapunov exponents to chara...
Starting from the classical Saltzman two-dimensional convection equations, we derive via a severe sp...
International audienceWe test a simple technique based on breeding to separate fast and slow unstabl...
International audienceWe study in detail the role of covariant Lyapunov vectors and their respective...
This is the final version. Available from European Geosciences Union via the DOI in this record.The ...
One of the most relevant weather regimes in the midlatitude atmosphere is the persistent deviation f...