On the finite element formulation of dynamic two-phase coupled problems

Abstract Two finite element approaches are discussed for the analysis of the coupled problems of seepage and deformation of saturated porous media in the presence of an acceleration field varying in time and space (e.g. during an earthquake). The equations governing the two phase problem in dynamic regime are recalled first under assumptions which seem reasonable in the geotechnical context. Then they are cast into a first finite element form without introducing further assumptions with respect to those adopted in deriving them. Subsequently, a simplified formulation is presented which requires a reduced number of nodal variables with respect to the first one. After discussing a time integration scheme, the two approaches are applied to the solution of a benchmark example and some comparative comments are presented on their accuracy and on the required computational effort.

[1]  Majidreza Nazem,et al.  Large deformation dynamic analysis of saturated porous media with applications to penetration problems , 2014 .

[2]  Lidija Zdravković,et al.  An assessment of time integration schemes for dynamic geotechnical problems , 2008 .

[3]  Károly Széchy,et al.  The art of tunnelling , 1966 .

[4]  B. Schrefler,et al.  The Finite Element Method in the Static and Dynamic Deformation and Consolidation of Porous Media , 1998 .

[5]  J. Bear Dynamics of Fluids in Porous Media , 1975 .

[6]  Tadahiko Shiomi,et al.  Practical Programming in Computational Geomechanics: With Special Reference to Earthquake Engineering , 1999 .

[7]  Jintai Chung,et al.  A Time Integration Algorithm for Structural Dynamics With Improved Numerical Dissipation: The Generalized-α Method , 1993 .

[8]  M. Biot General Theory of Three‐Dimensional Consolidation , 1941 .

[9]  Giancarlo Gioda,et al.  Numerical Evaluation of the Surface Displacements due to Soil Grouting and to Tunnel Excavation , 2007 .

[10]  Vukan R Vuchic,et al.  Urban transit systems and technology , 2007 .

[11]  O. C. Zienkiewicz,et al.  An alternative single‐step algorithm for dynamic problems , 1980 .

[12]  Majidreza Nazem,et al.  Dynamic analysis of a smooth penetrometer free-falling into uniform clay , 2012 .

[13]  Chandrakant S. Desai,et al.  Finite element residual schemes for unconfined flow , 1976 .

[14]  Nathan M. Newmark,et al.  A Method of Computation for Structural Dynamics , 1959 .

[15]  O. Zienkiewicz,et al.  Dynamic behaviour of saturated porous media; The generalized Biot formulation and its numerical solution , 1984 .

[16]  G. Gioda,et al.  Seepage-Induced Erosion in Granular Soil and Consequent Settlements , 2009 .

[17]  Edward L. Wilson,et al.  Nonlinear dynamic analysis of complex structures , 1972 .

[18]  O. C. Zienkiewicz,et al.  A unified set of single step algorithms part 3: The beta-m method, a generalization of the Newmark scheme , 1985 .

[19]  H. Westergaard Water Pressures on Dams During Earthquakes , 1933 .

[20]  E. Wilson,et al.  FINITE-ELEMENT ANALYSIS OF SEEPAGE IN ELASTIC MEDIA , 1969 .