A collection of results is presented regarding the consistency, stability and accuracy of operator split methods and product formula algorithms for general nonlinear equations of evolution. These results are then applied to the structural dynamics problem. The basic idea is to exploit an element-by-element additive decomposition of a particular form of the discrete dynamic equations resulting from a finite element discretization. It is shown that such a particular form of the discrete dynamic equations is obtained when velocity and stress are taken as unknowns. By applying the general product formula technique to the element-by-element decomposition, unconditionally stable algorithms are obtained that involve only element coefficient matric...
The algorithms of forming the matrix equations of equilibrium in solving geometrically nonlinear pro...
The basis of the FIC method is the satisfaction of the standard equations for balance of momentum (e...
The use of the finite element method of structural analysis in geometrically and materially nonlinea...
A collection of results is presented regarding the consistency, stability and accuracy of operator s...
The elastoplastic dynamic problem is first formulated in a form that facilitates the application of ...
This research is directed toward the analysis of large, three dimensional, nonlinear dynamic problem...
This report focuses on the implementation of the finite element method for nonlinear dynamical probl...
The dynamics of elastic solids and structures defines classical Hamiltonian systems with a very rich...
A method for formulating and algorithmically solving the equations of finite element problems is pre...
The primary objectives of the present exposition are to provide: (i) a generalized unified mathemati...
A numerical algorithm of strength and stability analysis of nonlinear deformable bar systems and thi...
The large number of unknown variables in a finite element idealization for dynamic structural analys...
A new computational method for the linear eigensolution of structural dynamics is proposed. The eige...
A new technique is proposed for developing refined element equations for structures for use in dynam...
International audienceIn this paper, we state in a new form the algebraic problem arising from the o...
The algorithms of forming the matrix equations of equilibrium in solving geometrically nonlinear pro...
The basis of the FIC method is the satisfaction of the standard equations for balance of momentum (e...
The use of the finite element method of structural analysis in geometrically and materially nonlinea...
A collection of results is presented regarding the consistency, stability and accuracy of operator s...
The elastoplastic dynamic problem is first formulated in a form that facilitates the application of ...
This research is directed toward the analysis of large, three dimensional, nonlinear dynamic problem...
This report focuses on the implementation of the finite element method for nonlinear dynamical probl...
The dynamics of elastic solids and structures defines classical Hamiltonian systems with a very rich...
A method for formulating and algorithmically solving the equations of finite element problems is pre...
The primary objectives of the present exposition are to provide: (i) a generalized unified mathemati...
A numerical algorithm of strength and stability analysis of nonlinear deformable bar systems and thi...
The large number of unknown variables in a finite element idealization for dynamic structural analys...
A new computational method for the linear eigensolution of structural dynamics is proposed. The eige...
A new technique is proposed for developing refined element equations for structures for use in dynam...
International audienceIn this paper, we state in a new form the algebraic problem arising from the o...
The algorithms of forming the matrix equations of equilibrium in solving geometrically nonlinear pro...
The basis of the FIC method is the satisfaction of the standard equations for balance of momentum (e...
The use of the finite element method of structural analysis in geometrically and materially nonlinea...