Based on the virtual work principle of interface problems, this paper presents an innovative finite element solution for interface problems by mixing nodal contact forces with nodal displacements. The proposed mixed finite element solution can overcome some numerical difficulties encountered in the analysis of contact problems in geomechanics. These difficulties include contact of large area, non-smooth contact, alleviation of ill-condition and treatment of rigid displacements. The well-posed issue of the formulation and a criterion for judging collapse of the system are also discussed in detail. The paper then presents two simple examples and a very challenging example from the shiplock of the Three Gorges Project in construction. These ex...
Abstract — The finite element method is used to model large sliding frictional contact problems in w...
We propose an enriched finite element formulation to address the computational modeling of contact p...
© 2014 O. A. Sachenkov, V. I. Mitryaikin, T. A. Zaitseva and Yu. G. Konoplev. The paper presents a t...
121 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2009.The computational modeling of...
The paper presents the main features of a hydro-mechanical coupled finite element of interface. The ...
The paper presents the main features of a hydro-mechanical coupled finite element of interface. The ...
With computers gaining more processing power during the last decades, Finite Element analysis has be...
Abstract. The paper briefly presents the main features of a hydro-mechanical coupled finite element ...
A novel mixed finite element method is proposed for static and dynamic contact problems with frictio...
Interface mechanical problems in heterogeneous materials require different physical interpretations ...
In the paper, the numerical tests of the contact of a pair of flexible elements were presented. The ...
[[abstract]]Two-dimensional elastic contact problems, including normal, tangential, and rolling cont...
給出了界面問題的混合有限元提法,由該提法可導出良態、小規模的有限元方程組。對于復雜接觸問題中的某些常見的技術性難題,如大面積、非光滑接觸問題、剛體位移問題等都給出了相應的處理技術。A mixed fo...
An important class of structural mechanics problems deals with the stress analysis of bodies in con...
An analytical formulation of the nodal forces induced by a dislocation segment on a surface element ...
Abstract — The finite element method is used to model large sliding frictional contact problems in w...
We propose an enriched finite element formulation to address the computational modeling of contact p...
© 2014 O. A. Sachenkov, V. I. Mitryaikin, T. A. Zaitseva and Yu. G. Konoplev. The paper presents a t...
121 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2009.The computational modeling of...
The paper presents the main features of a hydro-mechanical coupled finite element of interface. The ...
The paper presents the main features of a hydro-mechanical coupled finite element of interface. The ...
With computers gaining more processing power during the last decades, Finite Element analysis has be...
Abstract. The paper briefly presents the main features of a hydro-mechanical coupled finite element ...
A novel mixed finite element method is proposed for static and dynamic contact problems with frictio...
Interface mechanical problems in heterogeneous materials require different physical interpretations ...
In the paper, the numerical tests of the contact of a pair of flexible elements were presented. The ...
[[abstract]]Two-dimensional elastic contact problems, including normal, tangential, and rolling cont...
給出了界面問題的混合有限元提法,由該提法可導出良態、小規模的有限元方程組。對于復雜接觸問題中的某些常見的技術性難題,如大面積、非光滑接觸問題、剛體位移問題等都給出了相應的處理技術。A mixed fo...
An important class of structural mechanics problems deals with the stress analysis of bodies in con...
An analytical formulation of the nodal forces induced by a dislocation segment on a surface element ...
Abstract — The finite element method is used to model large sliding frictional contact problems in w...
We propose an enriched finite element formulation to address the computational modeling of contact p...
© 2014 O. A. Sachenkov, V. I. Mitryaikin, T. A. Zaitseva and Yu. G. Konoplev. The paper presents a t...