Randomized spectral and Fourier-wavelet methods for multidimensional Gaussian random vector fields
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Publication:347715
DOI10.1016/j.jcp.2013.03.021zbMath1349.65018OpenAlexW2025736957MaRDI QIDQ347715
Orazgeldi Kurbanmuradov, Peter R. Kramer, K. K. Sabel'fel'd
Publication date: 5 December 2016
Published in: Journal of Computational Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.jcp.2013.03.021
Monte CarlorandomizationLagrangianergodicspatial averageFourier waveletplane wave decompositionrandom field simulation
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Related Items (3)
Generation of nonhomogeneous turbulent velocity fields by modified randomized spectral method ⋮ Генерация трехмерных однородных изотропных турбулентных полей скорости на основе рандомизированного спектрального метода ⋮ Wavelet-based simulation of random processes from certain classes with given accuracy and reliability
Cites Work
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- Functional representation of power-law random fields and time series
- Higher-order implicit strong numerical schemes for stochastic differential equations
- Correlation theory of stationary and related random functions. Volume II: Supplementary notes and references
- A wavelet Monte Carlo method for turbulent diffusion with many spatial scales
- A new algorithm with plane waves and wavelets for random velocity fields with many spatial scales
- A Fourier-wavelet Monte Carlo method for fractal random fields
- A Krylov subspace method for covariance approximation and simulation of random processes and fields
- Finite difference heterogeneous multi-scale method for homogenization problems.
- Relative efficiency of Gaussian stochastic process sampling procedures.
- Random shearing direction models for isotropic turbulent diffusion
- Probabilistic methods in applied physics
- Homogenization and porous media
- Wave propagation and time reversal in randomly layered media.
- Comparative analysis of multiscale Gaussian random field simulation algorithms
- An Algorithmic Introduction to Numerical Simulation of Stochastic Differential Equations
- Stochastic flow simulation in 3D porous media
- Approximate models of stochastic processes and fields
- An Introduction to Fronts in Random Media
- Stochastic simulation of particle transport by a random Darcy flow through a porous cylinder
- Kinematic simulation of homogeneous turbulence by unsteady random Fourier modes
- Stochastic Lagrangian Models for Two-Particle Motion in Turbulent Flows
- Random Field Representation and Synthesis Using Wavelet Bases
- Stochastic Lagrangian Models for Two-Particle Motion in Turbulent Flows. Numerical Results
- Fast and Exact Simulation of Stationary Gaussian Processes through Circulant Embedding of the Covariance Matrix
- Stochastic Eulerian model for the flow simulation in porous media. Unconfined aquifers*
- Convergence of the randomized spectral models of homogeneous Gaussian random fields
- Diffusion by a Random Velocity Field
- Stochastic Spectral and Fourier-Wavelet Methods for Vector Gaussian Random Fields
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