有限变形弹性动力学的非传统Gurtin型变分原理

根据古典阴阳互补和现代对偶互补的基本思想，通过作者早已提出的一条简单而统一的途径，系统地建立了有限变形弹性动力学的各类非传统Gurtin型变分原理，给出一个以卷积表示的重要关系式，可以认为，该式是有限变形动力学的广义虚功原理的表式。从该式出发，不仅能得到有限变形动力学的虚功原理，而且通过给出的一系列广义Legendre变换，还能系统地成对导出5类变量，3类变量，2类变量和1类变量非传统Gurtin型变分原理的互补泛函。通过这条途径还能清楚地阐明这些原理之间的内在联系。     

微孔压电弹性动力学的能量原理

根据古典阴阳互补和现代对偶互补的基本思想,通过作者早已提出一条简单而统一的新途径,系统地建立了微孔压电弹性动力学的能量原理,给出一个重要的以卷积表示的积分关系式,可以认为,在力学上它是广义虚功原理的表式,从该式出发,不仅能得到微孔压电弹性动力学的虚功原理和互等定理,而且通过作者所给出的一系列广义Legendre变换,能系统地导出成互补关系的11类变量、9类变量、6类变量和3类变量简化Gurtin型变分原理的泛函,同时,通过这条新途径,还能清楚地阐明这些原理之间的内在联系。     

关于线粘弹性动力学中各种变分原理

本文提出一条简单而统一的新途径,系统地建立了线粘弹性动力学中各种简化Gurtin型变分原理,文中首先给出一个很有用的以卷积表示的积分关系式,然后从该式出发,系统地导出成互补关系的五类变量、四类变量、三类变量、二类变量及一类变量简化Gurtin型变分原理,并清楚地阐明它们之间的内在联系,而且,还发现当前在国际上有广泛影响的力学变分原理方面的名著[1]及文[2]中,所给出的四个变分原理的泛函式均有误.本文除给出这四个正确的泛函式外,还建立了一些新的更一般广义变分原理。     

有孔隙的耦合热弹性体动力学的一些基本原理

根据对偶互补的基本思想，通过作者在文［１］中所提出的一条简单而统一的新途径，系统地建立了有孔隙的耦合热弹性体动力学的一些基本原理．文中首先给出一个重要的以卷积表示的积分关系式，可以认为，在力学上它是一个广义虚功原理的表式．然后从该式出发，不仅可以得到有孔隙的耦合热弹性体动力学的虚功原理和互等定理，而且能系统地导出成互补关系的１１类变量、９类交量、６类变量及３类变量简化Ｇｕｒｔｉｎ型变分原理．同时，通过这条新途径，还能清楚地阐明这些原理之间的内在联系．     

论耦合热弹性力学中各种Gurtin型变分原理

本文提出了一条比巳有文献更简单更直接的新途径,系统地建立了耦合热弹性力学中各种Gurtin型变分原理。文中首先给出一个重要的以卷积表示的积分关系式,然后从该式出发,系统地导出成互补关系的八类变量、七类变量、六类变量、五类变量、四类变量、三类变量及二类变量的变分原理。而Nickell和Sackman,Carlson所给出的变分原理,只是本文所建立的新的更一股广义变分原理的部分特殊形式。并且,通过这条新途径,不仅能清楚地阐明各种Gurtin型变分原理之间的内在联系,而且能说明仅以应力场和热流场为独立变量的变分原理的建立过程。     

耦合热弹性动力学中各类Hamilton型拟变分原理

根据古典阴阳互补和现代对偶互补的基本思想,通过作者早已提出的一条简单而统一的途径,系统地建立了耦合热弹性动力学的各类Hamilton型拟变分原理。这种以单一泛函的变分式表示的Hamilton型拟变分原理,能精确反映耦合热弹力动力学初值－边值问题的全部特征。文中首先给出一个在力学上可以认为是广义拟虚功原理的表式。然后从该式出发,通过所给出的一系列广义Legendre变换,系统地推导出耦合热弹性动力学的8类变量、6类变量、4类变量和2类变量Hamilton型拟变分原理。同时,通过这条途径还能阐明这些原理的内在联系。     

非线性弹性薄壳静力学的一些基本原理

根据对偶互补的基本思想,系统地建立了非线性弹性薄壳静力学的各类变分原理.文中首先给出非线性薄壳静力学的广义虚功原理的表式,然后从该式出发,不仅能得到非线性薄壳静力学的虚功原理,而且通过所给出的广义Legendre变换,还能系统地成对导出非线性弹性薄壳静力学的3类变量(U,ε,x,N,M)、2类变量(U,N,M)变分原理、以及总势能驻值原理和总余能驻值原理的互补泛函.同时,通过这条新途径还能清楚地阐明这些原理的内在联系.     

非保守弹性动力学初值问题的简单Gurtin型拟变分原理

按照广义力和广义位移之间的对应关系,将弹性动力学基本方程卷积乘上相应的虚量,然后积分且代数相加,并利用体积力和面积力均为伴生力这一特征,建立了非保守系统初值问题的简单Gurtin型五类变量的完全拟变分原理.更进一步地还建立了非保守系统初值问题的简单Gurtin型不完全拟变分原理和有条件不完全拟变分原理.在建立非保守系统初值问题的各类简单Gurtin型拟变分原理的同时,还将变积方法推广为卷变积方法.最后,介绍了寻求伴生力的方法.     

变分原理和非线性力学

非线性力学应用广泛,研究它的求解方法日益重要。求解方法的基础是变分原理。本文将求解方法分成两类,一种是采用Gurtin的卷积形式,另一种是谱分解形式。作者曾对非线性力学的变分原理进行研究,建立了各种变分原理,其中较多地采用了谱分解形式。本文介绍了作者的一些工作,包括悬挂结构、薄壳、土力学和随机振动方面的变分原理,其中有关弹性-孔隙介质固结的动力学和随机振动的原理首次在本文中发表。根据变分原理可用有限元法求解。     

卷积型加权残值法求解薄壳的动力学问题

板壳等弹性体,受到动荷载作用时,其动力分析问题是比较重要且难于解决的．利用卷积型加权残值法,推导出Gurtin变分原理,并应用卷积型加权残值法计算了薄壳的动力学问题,为计算薄壳的结构动力学问题提供了一种有效的方法．     

UNCONVENTIONAL GURTIN-TYPE VARIATIONAL PRINCIPLES FOR FINITE DEFORMATION ELASTODYNAMICS

According to the basic idea of classical Yin-Yang complementarity and modern dual-complementarity,in a simple and unified new way proposed by Luo,the unconventional Gurtin-type variational prinicples for finite deformation elastodynamics can be established systemati-cally.In this paper,an important integral relation in terms of convolution is given,which canbe considered as the expression of the generalized principle of virtual work for finite deformationdynamics.Based on this relation,it is possible not only to obtain the principle of virtual work forfinite deformation dynamics,but also to derive systematically the complementary functionals forfive-field,three-field,two-field and one-field unconventional Gurtin-type variational principles bythe generalized Legendre transformations given in this paper.Furthermore,with this approach,the intrinsic relationship among various principles can be clearly explained.     

On some basic principles in dynamic theory of elastic materials with voids

According to the basic idea of dual-complementarity, in a simple and unified way proposed by the author^[1], some basic principles in dynamic theory of elastic materials with voids can be established systematically. In this paper, an important integral relation in terms of convolutions is given, which can be considered as the generalized principle of virtual work in mechanics. Based on this relation, it is possible not only to obtain the principle of virtual work and the reciprocal theorem in dynamic theory of elastic materials with voids, but also to derive systematically the complementary functionals for the eight-field, six-field, four-field and two-field simplified Gurtin-type variational principles. Furthermore, with this approach, the intrinsic relationship among various principles can be explained clearly. The project supported by the Foundation of Zhongshan University Advanced Research Center     

Unconventional Hamilton-type variational principles for nonlinear elastodynamics of orthogonal cable-net structures

According to the basic idea of classical yin-yang complementarity and modem dual-complementarity,in a simple and unified new way proposed by Luo,the unconven- tional Hamilton-type variational principles for geometrically nonlinear elastodynamics of orthogonal cable-net structures are established systematically,which can fully charac- terize the initial-boundary-value problem of this kind of dynamics.An important in- tegral relation is made,which can be considered as the generalized principle of virtual work for geometrically nonlinear dynamics of orthogonal cable-net structures in mechan- ics.Based on such relationship,it is possible not only to obtain the principle of virtual work for geometrically nonlinear dynamics of orthogonal cable-net structures,but also to derive systematically the complementary functionais for five-field,four-field,three-field and two-field unconventional Hamilton-type variational principles,and the functional for the unconventional Hamilton-type variational principle in phase space and the poten- tial energy functional for one-field unconventional Hamilton-type variational principle for geometrically nonlinear elastodynamics of orthogonal cable-net structures by the general- ized Legendre transformation given in this paper.Furthermore,the intrinsic relationship among various principles can be explained clearly with this approach.     

UNCONVENTIONAL HAMILTON-TYPE VARIATIONAL PRINCIPLES FOR DYNAMICS OF REISSNER SANDWICH PLATE

According to the basic idea of classical yin-yang complementarity and modern dual-complementarity,in a simple and unified way proposed by Luo(1987),some uncon- ventional Hamilton-type variational principles for dynamics of Reissner sandwich plate can be established systematically.The unconventional Hamilton-type variation principle can fully characterize the initial-boundary-value problem of this dynamics.In this pa- per,an important integral relation is given,which can be considered as the generalized principle of virtual work in mechanics.Based on this relation,it is possible not only to obtain the principle of virtual work in dynamics of Reissner sandwich plate,but also to derive systematically the complementary functionals for five-field,two-field and one-field unconventional Hamilton-type variational principles by the generalized Legender trans- formations.Furthermore,with this approach,the intrinsic relationship among the various principles can be explained clearly.     

Simplified Gurtin-type generalized variational principles for fully dynamic magneto-electro-elasticity with geometrical nonlinearity

The fundamental equations, governing all the variables of the initial boundary value problem in fully dynamic magneto-electro-elasticity with geometrical nonlinearity, are expressed in covariant differential form. The generalized principle of virtual work is given in terms of convolutions for the present problem. Two simplified Gurtin-type generalized variational principles, directly leading to all the fundamental equations, are deduced by using He’s semi-inverse method instead of Laplace transforms. By enforcing some fundamental equations as constraint conditions, one of various constrained variational principles is given as an example. By simply dropping out selected field functions, several reduced variational principles are obtained as special forms for piezoelectricity, elastodynamics, and electromagnetics, respectively. This paper aims at providing a more complete theoretical foundation for the finite element applications for the discussed problem.     

Energy principles in theory of elastic materials with voids

According to the basic idea of dual-complementarity, in a simple and unified way proposed by the author^[1], various energy principles in theory of elastic materials with voids can be established systematically. In this paper, an important integral relation is given, which can be considered essentially as the generalized pr. inciple of virtual work. Based on this relation, it is possible not only to obtain the principle of virtual work and the reciprocal theorem of work in theory of elastic materials with voids, but also to derive systematically the complementary functionals for the eight-field, six-field, four-field and two-field generalized variational principles, and the principle of minimum potential and complementary energies. Furthermore, with this appro ach, the intrinsic relationship among various principles can be explained clearly. The project supported by the National Natural Science Foundation of China