Infinite-dimensional porous media equations and optimal transportation

Stochastic equations for the prediction of contaminant migration in porous media are considered by the use of the decomposition method. The results are easily generalized to the nonlinear case as well. Important applications of significance in the environmental sciences and engineering are beginning

We generalize Talagrand's inequality in the theory of optimal transport and give some applications of our result. In particular, we establish an estimate for a couple of transportation mappings. In the finite-dimensional case we obtain a new log-Sobolev type inequality. In the infinite-dimensional c

The book that makes transport in porous media accessible to students and researchers alike Porous Media Transport Phenomena covers the general theories behind flow and transport in porous media-a solid permeated by a network of pores filled with fluid-which encompasses rocks, biological tissues, ce

Based on solving the Navier-Stokes equations in the two-dimensional percolation porous media for 500 di erent conÿgurations, the scaling relations for the uid permeability k and the inertial parameter ÿ in the Forchheimer equation are studied. In the vicinity of the critical threshold pc, the uid pe