A comparison of pore size distributions derived by NMR and X-ray-CT techniques
暂无分享,去创建一个
[1] The behavior of diffusion eigenmodes in the presence of internal magnetic field in porous media , 2001 .
[2] P. Sen,et al. Characterization of coupled pore systems from the diffusion eigenspectrum , 2002 .
[3] Hürlimann,et al. Effective Gradients in Porous Media Due to Susceptibility Differences , 1998, Journal of magnetic resonance.
[4] L. Feldkamp,et al. Practical cone-beam algorithm , 1984 .
[5] Johnson,et al. Magnetization evolution in connected pore systems. , 1991, Physical review. B, Condensed matter.
[6] Yi-Qiao Song. Using internal magnetic fields to obtain pore size distributions of porous media , 2003 .
[7] W. E. Kenyon,et al. Surface-to-volume ratio, charge density, nuclear magnetic relaxation, and permeability in clay-bearing sandstones , 1990 .
[8] W. B. Lindquist,et al. Pore and throat size distributions measured from synchrotron X-ray tomographic images of Fontaineble , 2000 .
[9] Y. Song. Pore sizes and pore connectivity in rocks using the effect of internal field. , 2001, Magnetic resonance imaging.
[10] H. C. Torrey. Bloch Equations with Diffusion Terms , 1956 .
[11] K. Mendelson,et al. Percolation model of nuclear magnetic relaxation in porous media. , 1990, Physical review. B, Condensed matter.
[12] P. Rüegsegger,et al. A new method for the model‐independent assessment of thickness in three‐dimensional images , 1997 .
[13] K. Brownstein,et al. Importance of classical diffusion in NMR studies of water in biological cells , 1979 .
[14] Seungoh Ryu,et al. Determining multiple length scales in rocks , 2000, Nature.
[15] Schwartz,et al. Self-diffusion in a periodic porous medium: A comparison of different approaches. , 1995, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.
[16] H P Huinink,et al. Random-walk simulations of NMR dephasing effects due to uniform magnetic-field gradients in a pore. , 2002, Physical review. E, Statistical, nonlinear, and soft matter physics.
[17] Johnson,et al. Magnetization evolution in connected pore systems. II. Pulsed-field-gradient NMR and pore-space geometry. , 1993, Physical review. B, Condensed matter.
[18] J. Thovert,et al. Grain reconstruction of porous media: application to a low-porosity Fontainebleau sandstone. , 2001, Physical review. E, Statistical, nonlinear, and soft matter physics.
[19] Morrell H. Cohen,et al. Nuclear magnetic relaxation and the internal geometry of sedimentary rocks , 1982 .
[20] S. Torquato,et al. Chord-distribution functions of three-dimensional random media: approximate first-passage times of Gaussian processes. , 1999, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics.