From the concept of four-dimensional space and under the four kinds of time limit conditions, some general theorems for elastodynamics are developed, such as the principle of possible work action, the virtual displacement principle, the virtual stress-momentum principle, the reciprocal theorems and the related theorems of time terminal conditions derived from it. The variational principles of potential energy action and complementary energy action, the H-W principles, the H-R principles and the constitutive variational principles for elastodynamics are obtained. Hamilton's principle, Toupin's work and the formulations of Ref. [5],[17]–[24] may be regarded as some special cases of the general principles given in the paper. By considering thr...
AbstractThe mechanically-based approach to non-local elastic continuum, will be captured through var...
Abstract. This paper gives an introduction to the formulation of parametrized variational principles...
The thesis is devoted to study of continuum mechanics and thermodynamics and the related mathematica...
Generalized variational principles with 11 - arguments, 9 - arguments, 5 - arguments, 3 - arguments ...
A new approach is proposed for the systematic derivation of varïous variational principles in linear...
summary:Three variational principles of linear elastodynamics for two initial conditions, recentrly ...
summary:Generalized variational principles, suggested by Hu Hai-Chang and Washizu or Hellinger and R...
Under the assumption of small displacements and strains, we formulate new variational principles for...
This chapter investigates applications of the principles of analyticalmechanics developed in chapter...
An extended version of generalized standard elasto-plastic material is considered in the framework o...
For four types of time boundary conditions, some generalized variational principles for conservative...
summary:Mixed boundary-value problem of the classical theory of elasticity is considered, where not ...
A variational principle of the complementary energy type is derived. Trial functions for the actual ...
The mechanically-based approach to non-local elastic continuum, will be captured through variational...
In the context of the linear theory of thermoelasticity without energy dissipation for homogeneous a...
AbstractThe mechanically-based approach to non-local elastic continuum, will be captured through var...
Abstract. This paper gives an introduction to the formulation of parametrized variational principles...
The thesis is devoted to study of continuum mechanics and thermodynamics and the related mathematica...
Generalized variational principles with 11 - arguments, 9 - arguments, 5 - arguments, 3 - arguments ...
A new approach is proposed for the systematic derivation of varïous variational principles in linear...
summary:Three variational principles of linear elastodynamics for two initial conditions, recentrly ...
summary:Generalized variational principles, suggested by Hu Hai-Chang and Washizu or Hellinger and R...
Under the assumption of small displacements and strains, we formulate new variational principles for...
This chapter investigates applications of the principles of analyticalmechanics developed in chapter...
An extended version of generalized standard elasto-plastic material is considered in the framework o...
For four types of time boundary conditions, some generalized variational principles for conservative...
summary:Mixed boundary-value problem of the classical theory of elasticity is considered, where not ...
A variational principle of the complementary energy type is derived. Trial functions for the actual ...
The mechanically-based approach to non-local elastic continuum, will be captured through variational...
In the context of the linear theory of thermoelasticity without energy dissipation for homogeneous a...
AbstractThe mechanically-based approach to non-local elastic continuum, will be captured through var...
Abstract. This paper gives an introduction to the formulation of parametrized variational principles...
The thesis is devoted to study of continuum mechanics and thermodynamics and the related mathematica...