Exact Averaging of Stochastic Equations for Flow in Porous Media

Shvidler, M. I.; Karasaki, Kenzi

doi:10.1007/s11242-007-9151-2

Cited by 7 publications

(8 citation statements)

References 15 publications

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“…). The self‐consistent approximation has a long tradition in many physics and engineering fields, including subsurface hydrology (Dagan, ; Rubin, ; Shvidler, ).…”

Section: Brief Recapitulation Of Numerical Methodology and Of Conductmentioning

confidence: 99%

Effective Hydraulic Conductivity of Three‐Dimensional Heterogeneous Formations of Lognormal Permeability Distribution: The Impact of Connectivity

Zarlenga

Janković

Fiori

et al. 2018

Water Resources Research

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Uniform mean flow takes place in a 3‐D heterogeneous formation of normal hydraulic logconductivity Y=ln⁡K. The aim of the study is to derive the dependence of the horizontal Kefh and vertical Kefv effective conductivities on the structural parameters of hydraulic conductivity and investigate the impact of departure from multi‐Gaussianity on Kef, by numerical simulations of flow in formations that share the same pdf and covariance of Y but differ in the connectivity of classes of Y. The main result is that for the extreme models of connected and disconnected high Y zones the ratio between the effective conductivities in isotropic media is much smaller than in 2‐D. The dependence of Kefh and Kefv upon the logconductivity variance and the anisotropy ratio is compared with existing approximations (first‐order, Landau‐Matheron conjecture, self‐consistent approximation). Besides the theoretical interest, the results offer a basis for empirical relationships to be used in applications.

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“…). The self‐consistent approximation has a long tradition in many physics and engineering fields, including subsurface hydrology (Dagan, ; Rubin, ; Shvidler, ).…”

Section: Brief Recapitulation Of Numerical Methodology and Of Conductmentioning

confidence: 99%

Effective Hydraulic Conductivity of Three‐Dimensional Heterogeneous Formations of Lognormal Permeability Distribution: The Impact of Connectivity

Zarlenga

Janković

Fiori

et al. 2018

Water Resources Research

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“…Cada um destes ensaios deve resultar em um problema determinístico cuja solução possa ser calculada. Em outra direção (do ponto de vista teórico), alguns autores procuram equações diferenciais determinísticas cujas soluções podem ser médias, momentos [9,18,20,22], e até mesmo a função de densidade de probabilidade [11,16] da solução.…”

Section: Dorini Cunha E Oliveiraunclassified

Soluções de Problemas envolvendo Equações Diferenciais Sujeitas a Incertezas

Dorini¹,

Cunha²,

Oliveira³

2011

TCAM

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Resumo. Este trabalho objetiva analisar, através de alguns exemplos, a influên-cia de se considerar aleatoriedades na solução de equações diferenciais com dados e/ou parâmetros aleatórios. Um comparativo das médias das soluções das equações estocásticas com as soluções das equações determinísticas simplificadas, nas quais substituímos os parâmetros aleatórios por suas médias, é apresentado. Estes exemplos mostram que a média da solução, que normalmente é uma informação relevante em aplicações, pode ser qualitativamente diferente da aproximação obtida pela solução de uma equação diferencial determinística na qual substituímos os parâmetros aleatórios por suas médias.Palavras-chave. Equações diferenciais estocásticas, variáveis aleatórias, esperança matemática, função de densidade de probabilidade.

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“…Later, Kabala and Sposito (1991) applied the second order cumulant expansion to reactive transport but again under stationary and divergence-free pore flow velocity assumptions. Shvidler and Karasaki (2003) also obtained the ensemble averaged transport equation in terms of cumulants like cumulant expansion averaging, but under divergence-free, time-wise random pore flow velocity assumptions.…”

Section: Introductionmentioning

confidence: 99%

Ground water contaminant transport by nondivergence-free, unsteady and nonstationary velocity fields

Sirin¹

2006

Journal of Hydrology

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Exact Averaging of Stochastic Equations for Flow in Porous Media

Cited by 7 publications

References 15 publications

Effective Hydraulic Conductivity of Three‐Dimensional Heterogeneous Formations of Lognormal Permeability Distribution: The Impact of Connectivity

Effective Hydraulic Conductivity of Three‐Dimensional Heterogeneous Formations of Lognormal Permeability Distribution: The Impact of Connectivity

Soluções de Problemas envolvendo Equações Diferenciais Sujeitas a Incertezas

Ground water contaminant transport by nondivergence-free, unsteady and nonstationary velocity fields

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