## A note on the averaging approach for the random linear transport equation |

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Alberto Ohashi application approximate the mean averaging approach Bolfarine Campinas Capelas de Oliveira Catuogno central moment right Conservation Laws consider the one-dimensional constant convective-diffusive equation correlation covariance function Cristina Cunha derivative with respect differential equation Distributions Dorini Error Model example F. V. Labra Fabio Fdbio Fourier Series Fractional Fred Furtado Garcia and Adriano Gaussian Graphs Heisenberg Group Igor Leite Freire illustrate our approach initial condition Julia Kohn-Laplace Equations Laura L. R. Rifo linear transport equation Main result Manifolds MATLAB mean concentration Mean left metric Monte Carlo method Multivariate Nancy non-random numerical experiments obtain Pavao Pedro PESQUISA porosity probability density function Proposition Quasilinear Schrodinger Equations random linear transport random velocity field rath moment satisfies Ronaldo Dias satisfies the equation satisfies the following Skew Soliton Solutions statistical moments Stochastic telegraph process third central tion Uberlandio Batista Severo Um(x V. H. Lachos valid variable variance middle Vi(x Victor Zambom