Up: Main Previous: Ackowledgements
References
Adler, P., Jacquin, C., Quiblier, J., 1990. Flow in simulated porous media.
Int. J. Multiph. Flow 16,691-712.
Adler, P., Jacquin, C., Thovert, J.-F., 1992. The formation factor of
reconstructed porous media. Water Resour. Res. 28, 1571.
Arns, C.H., Knackstedt, M.A., Pinczewski, W. Y., Lindquist, W.B., 2001.
Accurate computation of transport properties from microtomographic
images. Geophys. Res. Lett. 28, 3361−3364.
Arns, C.H., Knackstedt, M.A., Pinczewski, W.V:, Garboczi, E.G., 2002.
Computation of linear elastic properties from microtomographic images: methodology and agreement between theory and experiment. Geophysics 67,
1396-1405.
Arns, C.H., Knackstedt, M.A., Mecke, K.R., 2003. Reconstructing
complex materials via effective grain shapes. Phys. Rev. Lett. 91 (215506), 1-4.
Auzerias, F.M., Dunsmuir, J., Ferreol, B.B., Martys, N., Olson, J.,
Ramakrishnan, T.S., Rothman, D.H., Schwartz, L.M., 1996. Transport in sandstone: a study
based on three dimensional microtomography. Geophys. Res. Lett. 23, 705- 708.
Dunsmuir, J.H., Ferguson, S.R., D'Amico, K.L., 1991. Design and
operation of an imaging X-ray detector for microtomography. IOP Conf. Ser. 121,257-261.
Ferreol, B., Rothman, D., 1995. Lattice-Boltzmann simulations of
flow through Fontainebleau sandstone. Transp. Porous Media 20, 3-20.
Flannery, B.P., Deckman, H. W., Roberge, W.G., D'Amico, K.L.,
1987. Three-dimensional X-ray microtomography. Science 237,
1439-1444.
Fredrich, J., Greaves, K., Martin, J., 1993. Pore geometry and
transport properties of Fontainebleau sandstone. Int. J. Rock
Mech. Min. Sci. 30, 691-697.
Fredrich, J., Menendez, B., Wong, T.F., 1995. Imaging the pore
structure of geomaterials. Science 268, 276-279.
Hazlett, R.D., 1997. Statistical characterization and stochastic modeling
of pore networks in relation to fluid flow. Math. Geol. 29, 801-821.
Jacquin, C.G., 1964. Corrélation entre la perméabilite et les
caractéristiques géométriques du grès de Fontainebleau. Rev.
Inst. Fr. Pet. 19, 921.
Joshi, M., 1974. A class of stochastic models for porous materials.
PhD thesis, University of Kansas, Lawrence.
Lindquist, W.B., Venkatarangan, A., Dunsmuir, J., Wong, T.F.,
2000. Pore and throat size distributions measured from synchrotron
X-ray tomographic images of Fontainebleau sandstones. J. Geophys. Res. 105B, 21508.
Manwart, C., Aaltosalmi, U., Koponen, A., Hilfer, R., Timonen, J.,
2002. Lattice-Boltzmann and finite−difference simulations for
the permeability for three-dimensional porous media. Phys. Rev., E 66, 016702.
Martys, N.S., Chen, H., 1996. Simulation of multi component fluids
in complex three-dimensional geometries by the lattice Bo1tzmann
method. Phys. Rev., E 53, 743-750.
Martys, N.S., Hagedorn, J.G., Goujon D., Devaney, J.E., 1999.
Large scale simulations of single and multi component flow in
porous media. SPIE 309, 403.
Moctezuma−Berthier, A., Vizika, 0., Adler, P.M., 2002.
Macroscopic conductivity of vugular porous media. Transp. Porous Media
49,331-332.
Oh, W., Lindquist, W.B., 1999. Image thresholding by indicator
kriging. IEEE Trans. Pattern Anal. Mach. Intell, 21, 590.
Qian, Y.H., d'Humieres, D., Lamelland, P., 1986. Lattice BGK
models for Navier-stokes equation. Europhys. Lett. 2, 291.
Schwartz, L.M., Auzerias, F.M., Dunsmuir, I., Martys, N., Bentz,
D.P., Torquato, S., 1994. Transport and diffusion in three-dimensional
composite media. Physica, A 207, 28-36.
Serra, I., 1982. Image Analysis and Mathematical Morphology.
Academic Press, Amsterdam.
Spanne, P., Thover, J., Jacquin, I., Lindquist, W.B., Jones, K.,
Adler, P.M., 1994. Synchotron computed microtomography of porous media: topology and
transports. Phys. Rev. Lett. 73, 2001-2004.
Thovert, J.−F., Yousefian, F., Spanne, P., Jacquin, C.G., Adler,
P.M., 2001. Grain reconstruction of porous media: application to a low-porosity
Fontainebleau sandstone. Phys. Rev., E 63, 61307.
Yeong, C.L.Y., Torquato, S., 1998. Reconstructing random media.
Phys. Rev., E 57,495.
Up: Main Previous: Ackowledgements