Akemann G, Burda Z, Kieburg M. From integrable to chaotic systems: Universal local statistics of Lyapunov exponents. EPL. 2019;126(4): 40001.Systems where time evolution follows a multiplicative process are ubiquitous in physics. We study a toy model for such systems where each time step is given by multiplication with an independent random N x N matrix with complex Gaussian elements, the complex Ginibre ensemble. This model allows to explicitly compute the Lyapunov exponents and local correlations amongst them, when the number of factors M becomes large. While the smallest eigenvalues always remain deterministic, which is also the case for many chaotic quantum systems, we identify a critical double scaling limit N similar to M for the rest...
We study the statistical fluctuations of Lyapunov exponents in the discrete version of the non-integ...
We analyze the effect of finite memory on the Lyapunov exponent of products of random matrices by co...
We suggest that random matrix theory applied to a matrix of lengths of classical trajectories can be...
A hypothesis is presented for the universal properties of operators evolving under Hamiltonian dynam...
We consider the spectral statistics of the Floquet operator for disordered, periodically driven spin...
We propose the existence of a new universality in classical chaotic systems when the number of degre...
Abstract We introduce a simple quantum generalization of the spectrum of classical Lyapunov exponent...
We study the time evolution operator in a family of local quantum circuits with random �elds in a �x...
Lyapunov exponents lie at the heart of chaos theory, and are widely used in studies of complex dynam...
We study the probability densities of finite-time or local Lyapunov exponents in low-dimensional cha...
Proceedings, pp. 485—493 Our recent interest is focused on establishing the necessary and sufficient...
Finite-time Lyapunov exponents of generic chaotic dynamical systems fluctuate in time. These fluctua...
It was proposed recently that the out-of-time-ordered four-point correlator (OTOC) may serve as a us...
This dissertation describes mainly researches on the chaotic properties of some classical and quantu...
In this thesis I discuss some of the chaotic properties specific to systems of many particles and o...
We study the statistical fluctuations of Lyapunov exponents in the discrete version of the non-integ...
We analyze the effect of finite memory on the Lyapunov exponent of products of random matrices by co...
We suggest that random matrix theory applied to a matrix of lengths of classical trajectories can be...
A hypothesis is presented for the universal properties of operators evolving under Hamiltonian dynam...
We consider the spectral statistics of the Floquet operator for disordered, periodically driven spin...
We propose the existence of a new universality in classical chaotic systems when the number of degre...
Abstract We introduce a simple quantum generalization of the spectrum of classical Lyapunov exponent...
We study the time evolution operator in a family of local quantum circuits with random �elds in a �x...
Lyapunov exponents lie at the heart of chaos theory, and are widely used in studies of complex dynam...
We study the probability densities of finite-time or local Lyapunov exponents in low-dimensional cha...
Proceedings, pp. 485—493 Our recent interest is focused on establishing the necessary and sufficient...
Finite-time Lyapunov exponents of generic chaotic dynamical systems fluctuate in time. These fluctua...
It was proposed recently that the out-of-time-ordered four-point correlator (OTOC) may serve as a us...
This dissertation describes mainly researches on the chaotic properties of some classical and quantu...
In this thesis I discuss some of the chaotic properties specific to systems of many particles and o...
We study the statistical fluctuations of Lyapunov exponents in the discrete version of the non-integ...
We analyze the effect of finite memory on the Lyapunov exponent of products of random matrices by co...
We suggest that random matrix theory applied to a matrix of lengths of classical trajectories can be...