Abstract. Numerical simulation of high frequency waves in highly heterogeneous media is a challenging problem. Resolving the fine structure of the wave field typically requires extremely small time steps and spatial meshes. We show that capturing macroscopic quantities of the wave field, such as the wave energy density, is achievable with much coarser discretizations. We obtain such a result using a time splitting algorithm that solves separately and successively propagation and scattering in the simplified regime of the parabolic wave equation in a random medium. The mathematical theory of the convergence and statistical properties of the algorithm is based on the analysis of the Wigner transforms in random media. Our results provide a ste...
Abstract. We consider the stabilization (self-averaging) and destabilization of the energy of waves ...
Propagation of waves in a random medium is studied under the "quasioptics" and the "Markov random pr...
This paper generalizes well-established derivations of the radiative transfer equation from first pr...
Numerical simulation of high frequency waves in highly heterogeneous media is a challenging problem....
Numerical simulation of high frequency waves in highly heterogeneous media is a challenging problem...
International audienceThis work is concerned with the asymptotic analysis of a time-splitting scheme...
We consider the Liouville equations with highly heterogeneous Hamiltonians and their numerical solut...
AbstractThis paper considers the accuracy of the split-step solution for wave propagation in random ...
Abstract. In this paper we consider a nonlinear Schrödinger equation (NLS) with random coefficients...
International audienceWe study the paraxial wave equation with a randomly perturbed index of refract...
[1] Wave trains in high-frequency seismograms of local earthquakes are mostly composed of incoherent...
We study the scattering theory for the descrete Schrodinger equation with a random potential having ...
We investigate the evolution of the probability distribution function in time for some wave and Maxw...
Time‐independent wave propagation is treated in media where the index of refraction contains a rando...
The approach to the classical limit of wave mechanics is investigated where, in the classical limit,...
Abstract. We consider the stabilization (self-averaging) and destabilization of the energy of waves ...
Propagation of waves in a random medium is studied under the "quasioptics" and the "Markov random pr...
This paper generalizes well-established derivations of the radiative transfer equation from first pr...
Numerical simulation of high frequency waves in highly heterogeneous media is a challenging problem....
Numerical simulation of high frequency waves in highly heterogeneous media is a challenging problem...
International audienceThis work is concerned with the asymptotic analysis of a time-splitting scheme...
We consider the Liouville equations with highly heterogeneous Hamiltonians and their numerical solut...
AbstractThis paper considers the accuracy of the split-step solution for wave propagation in random ...
Abstract. In this paper we consider a nonlinear Schrödinger equation (NLS) with random coefficients...
International audienceWe study the paraxial wave equation with a randomly perturbed index of refract...
[1] Wave trains in high-frequency seismograms of local earthquakes are mostly composed of incoherent...
We study the scattering theory for the descrete Schrodinger equation with a random potential having ...
We investigate the evolution of the probability distribution function in time for some wave and Maxw...
Time‐independent wave propagation is treated in media where the index of refraction contains a rando...
The approach to the classical limit of wave mechanics is investigated where, in the classical limit,...
Abstract. We consider the stabilization (self-averaging) and destabilization of the energy of waves ...
Propagation of waves in a random medium is studied under the "quasioptics" and the "Markov random pr...
This paper generalizes well-established derivations of the radiative transfer equation from first pr...