Stochastic averaging of nonlinear flows in heterogeneous porous media

DANIEL M. TARTAKOVSKY; ALBERTO GUADAGNINI; MONICA RIVA

doi:10.1017/S002211200300538X

Abstract

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We consider flow in partially saturated heterogeneous porous media with uncertain hydraulic parameters. By treating the saturated conductivity of the medium as a random field, we derive a set of deterministic equations for the statistics (ensemble mean and variance) of fluid pressure. This is done for three constitutive models that describe the nonlinear dependence of relative conductivity on pressure. We use the Kirchhoff transform to map Richards equation into a linear PDE and explore alternative closures for the resulting moment equations. Regardless of the type of nonlinearity, closure by perturbation is more accurate than closure based on the non-perturbative Gaussian mapping. We also demonstrate that predictability of unsaturated flow in heterogeneous porous media is enhanced by choosing either the Brooks–Corey or van Genuchten constitutive model over the Gardner model.

Crossref Citations

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Xiu, Dongbin and Tartakovsky, Daniel M. 2004. A Two-Scale Nonperturbative Approach to Uncertainty Analysis of Diffusion in Random Composites. Multiscale Modeling & Simulation, Vol. 2, Issue. 4, p. 662.

Tartakovsky, Alexandre M. Garcia‐Naranjo, Luis and Tartakovsky, Daniel M. 2004. Transient Flow in a Heterogeneous Vadose Zone with Uncertain Parameters. Vadose Zone Journal, Vol. 3, Issue. 1, p. 154.

Xiu, D. and Tartakovsky, D.M. 2004. Computational Methods in Water Resources: Volume 1. Vol. 55, Issue. , p. 695.

Bakr, Mahmoud I. and Butler, Adrian P. 2005. Nonstationary stochastic analysis in well capture zone design using first‐order Taylor's series approximation. Water Resources Research, Vol. 41, Issue. 1,

Severino, Gerardo and Santini, Alessandro 2005. On the effective hydraulic conductivity in mean vertical unsaturated steady flows. Advances in Water Resources, Vol. 28, Issue. 9, p. 964.

Manouzi, Hassan Seaı¨d, Mohammed and Zahri, Mostafa 2007. Wick-stochastic finite element solution of reaction–diffusion problems. Journal of Computational and Applied Mathematics, Vol. 203, Issue. 2, p. 516.

Vereecken, H. Kasteel, R. Vanderborght, J. and Harter, T. 2007. Upscaling Hydraulic Properties and Soil Water Flow Processes in Heterogeneous Soils: A Review. Vadose Zone Journal, Vol. 6, Issue. 1, p. 1.

Ma, Xiang and Zabaras, Nicholas 2008. A stabilized stochastic finite element second-order projection method for modeling natural convection in random porous media. Journal of Computational Physics, Vol. 227, Issue. 18, p. 8448.

Tartakovsky, Alexandre M. Bolster, Diogo and Tartakovsky, Daniel M. 2008. Hydrogeophysical Approach for Identification of Layered Structures of the Vadose Zone from Electrical Resistivity Data. Vadose Zone Journal, Vol. 7, Issue. 4, p. 1253.

Wang, Peng Quinlan, Peter and Tartakovsky, Daniel M. 2009. Effects of spatio‐temporal variability of precipitation on contaminant migration in the vadose zone. Geophysical Research Letters, Vol. 36, Issue. 12,

de Jong van Lier, Quirijn Dourado Neto, D. and Metselaar, Klaas 2009. Modeling of transpiration reduction in van Genuchten–Mualem type soils. Water Resources Research, Vol. 45, Issue. 2,

Tartakovsky, Daniel M. Dentz, Marco and Lichtner, Peter C. 2009. Probability density functions for advective‐reactive transport with uncertain reaction rates. Water Resources Research, Vol. 45, Issue. 7,

Mohan, P. Surya Nair, Prasanth B. and Keane, Andy J. 2009. Inexact Picard iterative scheme for steady-state nonlinear diffusion in random heterogeneous media. Physical Review E, Vol. 79, Issue. 4,

Broyda, S. Dentz, M. and Tartakovsky, D. M. 2010. Probability density functions for advective–reactive transport in radial flow. Stochastic Environmental Research and Risk Assessment, Vol. 24, Issue. 7, p. 985.

Severino, G. Comegna, A. Coppola, A. Sommella, A. and Santini, A. 2010. Stochastic analysis of a field-scale unsaturated transport experiment. Advances in Water Resources, Vol. 33, Issue. 10, p. 1188.

Lin, G. Tartakovsky, A.M. and Tartakovsky, D.M. 2010. Uncertainty quantification via random domain decomposition and probabilistic collocation on sparse grids. Journal of Computational Physics, Vol. 229, Issue. 19, p. 6995.

Di Federico, Vittorio Pinelli, Marco and Ugarelli, Rita 2010. Estimates of effective permeability for non-Newtonian fluid flow in randomly heterogeneous porous media. Stochastic Environmental Research and Risk Assessment, Vol. 24, Issue. 7, p. 1067.

Teodorovich, E. V. Spesivtsev, P. E. and Nœtinger, B. 2011. A Stochastic Approach to the Two-Phase Displacement Problem in Heterogeneous Porous Media. Transport in Porous Media, Vol. 87, Issue. 1, p. 151.

Wang, Peng and Tartakovsky, Daniel M. 2011. Reduced complexity models for probabilistic forecasting of infiltration rates. Advances in Water Resources, Vol. 34, Issue. 3, p. 375.

Le, Thi Minh Hue Gallipoli, Domenico Sanchez, Marcelo and Wheeler, Simon J. 2012. Stochastic analysis of unsaturated seepage through randomly heterogeneous earth embankments. International Journal for Numerical and Analytical Methods in Geomechanics, Vol. 36, Issue. 8, p. 1056.

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Stochastic averaging of nonlinear flows in heterogeneous porous media

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