A note on transport of a pulse of nonlinearly reactive solute in a heterogeneous formation |
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| Authors: | G Severino G Dagan CJ van Duijn |
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| Institution: | (1) Department of Agricultural Engineering, Naples University, Portici, Italy;(2) Department of Fluid Mechanics and Heat Transfer, Tel Aviv University, Tel Aviv, Israel;(3) Department of Mathematics, Delft University of Technology, Delft, The Netherlands |
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| Abstract: | Saturated flow takes place in geological formations of spatially variable permeability which is regarded as a stationary random
space function of given statistical moments. The flow is assumed to be uniform in the mean and the Eulerian velocity field
has stationary fluctuations. Water carries solutes that react according to the nonlinear equilibrium Freundlich isotherm.
Neglecting pore scale dispersion (high Peclet number), we study the behavior of an initially finite pulse injection of constant
concentration.
Mean flux-averaged concentration is derived in a simple manner by using the previously determined solution of transport in
a homogeneous one-dimensional medium and the Lagrangian methodology developed by Cvetkovic and Dagan 5] to model reactive
transport in a three-dimensional flow field.
The mean breakthrough curves are computed and the combined effect of reactive parameters and heterogeneity upon reduction
of the concentration peak is investigated. Furthermore, with the aid of temporal moments, we determine equivalent reaction
and macrodispersion coefficients pertinent to a homogeneous medium.
This revised version was published online in July 2006 with corrections to the Cover Date. |
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