This article analyzes in detail the statistical and measure-theoretical properties of the nonuniform stationary measure, referred to as the w-invariant measure, associated with the spatial length distribution of the integral manifolds of the unstable invariant foliation in two-dimensional differentiable area-preserving systems. The analysis is developed starting from a sequence of analytical approximations for the associated density. These approximations are related to the properties of the Jacobian matrix of the nth iteration of a Poincaré map. The w-invariant measure plays a fundamental role in the study of transport phenomena in laminar-chaotic fluid-mixing systems, for which it furnishes the asymptotic invariant distribution of intermat...
We investigate the statistical properties of a piecewise smooth dynamical system by studying direct...
(Communicated by Yuri Kifer) Abstract. We introduce pointwise dimensions and spectra associated with...
We consider a 3D volume preserving system inside the unit sphere. The system is a small perturbatio...
This article analyzes the relationship between geometric invariant structures in two-dimensional mix...
Numerical investigations conducted over a wealth of nonlinear area-preserving smooth maps (e.g. the ...
We propose a piecewise linear, area-preserving, continuous map of the two-torus as a prototype of no...
This article analyzes the global invariant properties of a class of exactly solvable area-preserving...
This article extends the analysis developed by Giona and Adrover [M. Giona, A. Adrover, Phys. Rev. L...
In this article we analyze the invariant geometric properties of three-dimensional (3-D) chaotic flo...
This article shows numerically that the variance of the stretching exponents for two-dimensional cha...
This paper demonstrates that the geometry and topology of material lines in time-periodic chaotic fl...
This article proposes the concept of Symmetric Product Measures (SPM) for addressing the geometric c...
We studied invariant measures and invariant densities for dynamical systems with random switching (s...
We expand the ergodic theory developed by Furstenberg and Hochman on dynamical systems that are obta...
In the theory of quantum chaos one studies the semiclassical behaviour of quantum mechanical systems...
We investigate the statistical properties of a piecewise smooth dynamical system by studying direct...
(Communicated by Yuri Kifer) Abstract. We introduce pointwise dimensions and spectra associated with...
We consider a 3D volume preserving system inside the unit sphere. The system is a small perturbatio...
This article analyzes the relationship between geometric invariant structures in two-dimensional mix...
Numerical investigations conducted over a wealth of nonlinear area-preserving smooth maps (e.g. the ...
We propose a piecewise linear, area-preserving, continuous map of the two-torus as a prototype of no...
This article analyzes the global invariant properties of a class of exactly solvable area-preserving...
This article extends the analysis developed by Giona and Adrover [M. Giona, A. Adrover, Phys. Rev. L...
In this article we analyze the invariant geometric properties of three-dimensional (3-D) chaotic flo...
This article shows numerically that the variance of the stretching exponents for two-dimensional cha...
This paper demonstrates that the geometry and topology of material lines in time-periodic chaotic fl...
This article proposes the concept of Symmetric Product Measures (SPM) for addressing the geometric c...
We studied invariant measures and invariant densities for dynamical systems with random switching (s...
We expand the ergodic theory developed by Furstenberg and Hochman on dynamical systems that are obta...
In the theory of quantum chaos one studies the semiclassical behaviour of quantum mechanical systems...
We investigate the statistical properties of a piecewise smooth dynamical system by studying direct...
(Communicated by Yuri Kifer) Abstract. We introduce pointwise dimensions and spectra associated with...
We consider a 3D volume preserving system inside the unit sphere. The system is a small perturbatio...