[[1] BARTLEWSKA M., STRZELECKI T., Equations of Biots consolidation with Kelvin-Voight rheological frame, Studia Geotechnica et Mechanica, Vol. XXXI, 2009, No. 2, 3–15.]Search in Google Scholar
[[2] BARTLEWSKA–URBAN M., STRZELECKI T., Thermal consolidation of porous medium with a rheological Kelvin–Voigt skeleton, Studia Geotechnica et Mechanica, 2012, 34, 3, 17–35.10.2478/sgm031202]Search in Google Scholar
[[3] BIOT M.A., General theory of three–dimensional consolidation, J. Appl. Phys., 1941, 12, 155.10.1063/1.1712886]Search in Google Scholar
[[4] BIOT M.A., General Solutions of the Equations of Elasticity and Consolidation of a Porous Material, J. Appl. Mech., 1956, 23.10.1115/1.4011213]Search in Google Scholar
[[5] DERSKI W., Some Contributions to the Theory of Flow of Fluids through porous Deformable Media, Acta Mechanica, 1967, IV/1.10.1007/BF01291084]Search in Google Scholar
[[6] BENSOUSSAN A., LIONS J.L., PAPANICOLAU G., Asymptotic analysis for periodic structures, North Holland Publishing Company, Amsterdam 1978.]Search in Google Scholar
[[7] AURIAULT J.L., Dynamic behaviour of porous media, Transport Processes in Porous Media, Kluver Academic Publishers, 1991, 471–519.10.1007/978-94-011-3628-0_9]Search in Google Scholar
[[8] AURIAULT J.L., SANCHEZ PALENCIA E., Etude de comportement macroscopique d'un milieu poreuxsature deformable, Journal de Mecanique, 1977, 16 (4), 575–603.]Search in Google Scholar
[[9] KRÖNER E., Effective elastic moduli of periodic and random media: a unification, Mechanics Research Communication, 1980, 7 (5), 323–327.10.1016/0093-6413(80)90072-5]Search in Google Scholar
[[10] RUBINSTEIN J., TORQUATO S., Flow in random porous media: mathematical formulation, variational principles and rigorous bounds, J. Fluid Mech., 1989, 206, 25–46.10.1017/S0022112089002211]Search in Google Scholar
[[11] AURIAULT J.L., STRZELECKI T., BAUER J. HE S., Porous deformable media by a very compressible fluid, Eur. J. Mech. a. Solid, 1990, 9, 4, 373–392.]Search in Google Scholar
[[12] BARTLEWSKA–URBAN M., STRZELECKI T., One–dimensional consolidation of the porous medium with the rheological Kelvin–Voigt skeleton, Studia Geotechnica et Mechanica, 2008, 30, 1/2, 115–122.]Search in Google Scholar
[[13] COUSSY O., Mechanics and physics of porous solids, John Wiley & Sons, 2011.10.1002/9780470710388]Search in Google Scholar
[[14] KOWALSKI S.J., MUSIELAK G., RYBICKI A., Drying Processes in Context of the Theory of Fluid Saturated Porous Materials, J. Theoretical and Applied Mechanics, 1998, 36, 3.]Search in Google Scholar
[[15] STRZELECKI T., KOSTECKI S., ZAK S., Modelowanie przeplywów przez ośrodki porowate, Dolnoślśkie Wydawnictwo Edukacyjne, Wroclaw 2008.]Search in Google Scholar
[[16] CUDNY M., BINDER K. Kryteria wytrzymalości gruntu na ścinanie w zagadnieniach geotechniki (On shear strength criteria for soils in geotechnics), Inśynieria Morska i Geotechnika, 2005, 6, 456–465 (PDF).]Search in Google Scholar
[[17] NIEMUNIS A., Über die Anwendung der Kontinuumstheorie auf bodenmechanische Probleme, Eine Vorlesung für Grundbau- und Tunnelbauvertiefer, Uniwersytet w Bochum, on line: www.gub.ruhr-uni-bochum.de/mitarbeiter/andrzej_niemunis.htm, 2003.]Search in Google Scholar
[[18] BARTLEWSKA M., The doctoral dissertation on the theme: Określenie parametrów efektywnych modeli reologicznych gruntów spoistych, Politechnika Wroclawska, Faculty of Geoengineering, Mining and Geology, Wroclaw 2009.]Search in Google Scholar