4.7 Article

Non-local diffusion models for fractured porous media with pressure tests applications

Related references

Note: Only part of the references are listed.
Article Physics, Multidisciplinary

Hydrodynamic dispersion in heterogeneous anisotropic porous media: A simple model for anomalous diffusion emergence

D. Hernandez et al.

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2018)

Article Engineering, Chemical

New Paradigms and Future Critical Directions in Heterogeneous Catalysis and Multifunctional Reactors

Makarand R. Gogate

CHEMICAL ENGINEERING COMMUNICATIONS (2017)

Article Energy & Fuels

Nonlocal Diffusion in Fractured Rocks

R. Raghavan et al.

SPE RESERVOIR EVALUATION & ENGINEERING (2017)

Article Energy & Fuels

Rate Decline, Power Laws, and Subdiffusion in Fractured Rocks

R. Raghavan et al.

SPE RESERVOIR EVALUATION & ENGINEERING (2017)

Article Physics, Multidisciplinary

Short note on the emergence of fractional kinetics

Gianni Pagnini

PHYSICA A-STATISTICAL MECHANICS AND ITS APPLICATIONS (2014)

Article Mathematics, Applied

Complexities in modeling of heterogeneous catalytic reactions

Frerich J. Keil

COMPUTERS & MATHEMATICS WITH APPLICATIONS (2013)

Article Physics, Fluids & Plasmas

Fractal continuum model for tracer transport in a porous medium

E. C. Herrera-Hernandez et al.

PHYSICAL REVIEW E (2013)

Article Environmental Sciences

Telegraphic double porosity models for head transient behavior in naturally fractured aquifers

D. Hernandez et al.

WATER RESOURCES RESEARCH (2013)

Article Geosciences, Multidisciplinary

Non-diffusive, non-local transport in fluids and plasmas

D. del-Castillo-Negrete

NONLINEAR PROCESSES IN GEOPHYSICS (2010)

Review Pharmacology & Pharmacy

Mathematical modeling of drug delivery

J. Siepmann et al.

INTERNATIONAL JOURNAL OF PHARMACEUTICS (2008)

Review Geochemistry & Geophysics

Modeling non-Fickian transport in geological formations as a continuous time random walk

Brian Berkowitz et al.

REVIEWS OF GEOPHYSICS (2006)

Review Physics, Multidisciplinary

The restaurant at the end of the random walk: recent developments in the description of anomalous transport by fractional dynamics

R Metzler et al.

JOURNAL OF PHYSICS A-MATHEMATICAL AND GENERAL (2004)

Article Environmental Sciences

Transport behavior of a passive solute in continuous time random walks and multirate mass transfer

M Dentz et al.

WATER RESOURCES RESEARCH (2003)

Article Chemistry, Physical

Towards a unified framework for anomalous transport in heterogeneous media

H Scher et al.

CHEMICAL PHYSICS (2002)

Article Physics, Multidisciplinary

An ant in a gurge

BJ West et al.

PHYSICS LETTERS A (2001)

Review Physics, Multidisciplinary

The random walk's guide to anomalous diffusion: a fractional dynamics approach

R Metzler et al.

PHYSICS REPORTS-REVIEW SECTION OF PHYSICS LETTERS (2000)

Article Physics, Multidisciplinary

Accelerating Brownian motion: A fractional dynamics approach to fast diffusion

R Metzler et al.

EUROPHYSICS LETTERS (2000)