弹性理论中广义变分原理的研究及其在有限元计算中的应用(续)

四大位移非线性弹性体的广义变分原理--完全的和不完全的我们也可以通过拉格朗日乘子法,导出大位移非线性弹性体的有关广义变分原理,设λ_(ij)和μ_i为待定的拉格朗日乘子,于是根据(49)式导出的无条件的广义变分泛函为 ...     

建议一种非线性弹性论的约束变分原理及其与广义变分原理的协调性

本文建议一种新的约束变分原理,通过拉氏乘子法构成广义变分原理,其拉氏乘子不为零值.     

弹性理论中的临界变分及消除方法

临界变分现象是拉氏乘子法的固有特性，钱伟长应用高阶拉氏乘子消除了临界变分现象。本文将提出一种新的方法－凑合反推法，这种方法摒充了拉氏乘子法，把拉氏乘子所在的项目一个待定函数Ｆ代替。这样构成的泛函，作者称之为试泛函。而待定函数Ｆ的识别类似于拉氏乘子的识别。通过该法可以方便地构造出各种多变量广义变分原理，并且可以消除临界变分现象。     

关于拉格朗日乘子法及其它

本文通过推理和举例,说明了在力学问题中正确应用拉氏乘子法的要点。指出了对应于一个力学问题可能有多个不等价的和等价的变分原理,说明了有些所谓更一般的广义变分原理乃是众所周知的变分原理的简单组合。     

弹性理论中广义变分原理的研究及其在有限元计算中的应用

本文的目的在于说明怎样系统地建立各种广义变分原理,怎样合理地使用各种广义变分原理来改进有限元计算的成效。为了易于说明问题,本文只局限于弹性理论的各种广义变分原理,但其推广并不困难。本文指出,广义变分原理的泛函,可以系统地采用拉格朗日乘子法,把一般有条件的变分原理化为无条件的变分原理来唯一地决定的。拉格朗日乘子所代表的物理量,可以通过变分求极值或驻值的过程求得,从而消除了在建立广义变分原理的泛函时,人们经常陷入的象猜谜一样的困境。本文也指出:我们同样可以用拉格朗日乘子法把一般有多个条件的变分原理,化为条件个数较少的变分原理。我们称变分条件减少了的变分原理为各级不完全的广义变分原理。凡是把全部变分条件都消除了的变分原理,称为完全的广义变分原理,或简称广义变分原理;实际上是完全无条件的变分原理。本文建立了弹性小位移变形理论中的各级不完全的广义位能原理,和各级不完全的广义余能原理,包括从最小位能原理和最小余能原理分别导出的最完全的广义变分原理;并且证明了这两个弹性力学广义变分原理的泛函是等同的。在这些广义变分原理中,包括了Hellinger-Reissner(1950),胡海昌-鹫津久一郎(1955)的广义变分原理。本文也建立了弹性大位移变形理论中的位能原理和余能原理,并建立了有关位能余能的各级不完全的广义变分原理,包括以大位移变形的最小位能和最小余能原理分别导出的弹性力学广义变分原理,并且也证明了在大位移变形情况下,这两个弹性力学的广义变分原理也是等同的。本文除了列举广义变分原理在有限元法上的众所周知的应用外,还补充了三个比较重要的应用范围。     

粘性流体动力学有限元变分原理

本文把建立有限元变分原理的一种新方法“N>2直接方法”从固体力学推广到流体力学,并用该方法把粘性流体动力学的广义功率消耗原理和广义变分原理发展成为有限元变分原理。还在论证中发现,相邻有限元交界面上的应力协调条件会自然地满足而无需引进任何拉民乘子。本文还建立了混合杂交非协调元的变分原理和广义变分原理,它解除了全部协调性约束条件和其它的边界性约束条件,但是并不增加待定的拉氏乘子,因此使有限元计算得到简化。本文结果可以作为粘性流体动力学有限元计算的基础定理。     

粘性流动动力学有限元变分原理

本文把建立有限元变分原理的一种新方法“Ｎ〉２直接方法”从固体力学推广到流体力学，并用该方法把粘性流体动力学的广义功率消耗原理＾［２］和广义变分原理＾［２］发展成为有限元变分原理。还在论证中发现，相邻有限元交界面上的应力协调条件会自然地满足而无需引进任何拉氏乘子。本文还建立了混合杂交非协调元的变分原理和广义变分原理，它解除了全部协调性约束条件和其它的边界性约束条件，但是并不增加待定的拉氏乘子，因此使     

关于非保守非线性动力弹性理论的广义变分原理

本文关于非线性弹性理论三类共轭变量对应的六种基本方程,用二变量和三变量直接法构成十二种互有联系的非保守动力体系的拟广义变分原理,它们形成一种统一理论;其中部分内容为文[2]用虚功原理——Lagrange乘子法导出的结果,但比之具有更普遍的意义.     

非线性弹性体大变形问题的新广义变分原理

本文把作者在文[1]中得到的关于非线性弹性体小变形问题的结果,推广到大变形问题,建立了非线性弹性体大变形问题的广义的余能原理。利用本文结果,有可能构造出新的有限元模型。本文还明确指出了本文结果和若干已知的含三类独立变量σ(应力)、e(应变)、u(位移)的无条件的变分原理中的自变量σ、e,仍然受到对称张量的变分约束条件的限制。这在变分原理的理论阐述和实际应用中都是有益的和不可忽视的。     

关于拉氏乘子的识别

本文讨论了在消元识别和换元识别过程中拉氏乘子的不唯一性问题，拉氏乘子表达方式的不唯一性反映了消元或换元方式的多样性，由于不同的消元或换元方式不改变问题，拉氏乘子的解仍是唯一的，因而由不同的拉氏乘子表达式可以得到一族具有价驻值条件的无约束驻值问题，本文用换元识别法，推导了Ｈｅｌｌｉｎｇｅｒ－Ｒｅｉｓｓｎｅｒ变分原理和胡一鹫变分原理及其更多样的形式。     

Involutory transformations and variational principles with multi-varoables in thin plate bending problems

In this paper, the generalizd variational principles of plate bending, froblems are established from their minimum potential energy principle and minimum complementary energy principle through the elimination of their constraints by means of the method of Lagrange multipliers. The involutory transformations are also introduced in order to reduce the order of differentiations for the variables in the variation. Funhermore, these involutory transformations become infacl the additional constraints in the varialion. and additional Lagrange multipliers may be used in order to remove these additional constraints. Thus, various multi-variable variational principles are obtained for the plate bending problems. However, it is observed that. nol all the constrainls ofva’iaticn can be removed simply by the ordinary method of linear Lagrange multipliers. In such cases, the method of high-order Lagrange multipliers are usedto remove iliose constrainls left over by ordinary linear multiplier method. And consequently. some funct ionals of more general forms are oblained for the generaleed variational principles of plate bending problems.     

Method of high-order lagrange multiplier and generalized variational principles of elasticity with more general forms of functionals

It is known[1]that the minimum principles of potential energy andcomplementary energy are the conditional variation principles underrespective conditions of constraints.By means of the method of La-grange multipliers,we are able to reduce the functionals of condi-tional variation principles to new functionals of non-conditionalvariation principles.This method can be described as follows:Mul-tiply undetermined Lagrange multipliers by various constraints,andadd these products to the original functionals.Considering these un-determined Lagrange multipliers and the original variables in thesenew functionals as independent variables of variation,we can see thatthe stationary conditions of these functionals give these undeter-mined Lagrange multipliers in terms of original variables.The sub-stitutions of these results for Lagrange multipliers into the abovefunctionals lead to the functionals of these non-conditional varia-tion principles.However,in certain cases,some of the undetermined Lagrangemultipliers ma     

Variational principles and generalized variational principles for nonlinear elasticity with finite displacement

In a previous paper (1979)^[1], the minimum potential energy principle and stationary complementary energy principle for nonlinear elasticity with finite displacement, together with various complete and incomplete generalized principles were studied. However, the statements and proofs of these principles were not so clearly stated about their constraint conditions and their Euler equations. In somecases, the Euler equations have been mistaken as constraint conditions. For example, the stress displacement relation should be considered as Euler equation in complementary energy principle but have been mistaken as constraint conditions in variation. That is to say, in the above mentioned paper, the number of constraint conditions exceeds the necessary requirement. Furthermore, in all these variational principles, the stress-strain relation never participate in the variation process as constraints, i.e., they may act as a constraint in the sense that, after the set of Euler equations is solved, the stress-strain relation may be used to derive the stresses from known strains, or to derive the strains from known stresses. This point was not clearly mentioned in the previous paper (1979)^[1]. In this paper, the high order Lagrange multiplier method (1983)^[2] is used to construct the corresponding generalized variational principle in more general form. Throughout this paper, V/.V. Novozhilov's results (1958)^[3] for nonlinear elasticity are used.     

Variational principles in elasticity with nonlinear stress-strain relation

Since 1979, a series of papers have been published concerning the variational principles and generalized variational principles in elasticity such as [1] (1979), [6] (1980), [2,3] (1983) and [4,5] (1984). All these papers deal with the elastic body with linear stress-strain relations. In 1985, a book was published on generalized variational principles dealing with some nonlinear elastic body, but never going into detailed discussion. This paper discusses particularly variational principles and generalized variational principles for elastic body with nonlinear stress-strain relations. In these discussions, we find many interesting problems worth while to pay some attention. At the same time, these discussions are also instructive for linear elastic problems. When the strain is small, the high order terms may be neglected, the results of this paper may be simplified to the well-known principles in ordinary elasticity problems.     

浅曲梁大挠度分析的余能有限元方法

以高玉臣提出的弹性大变形余能原理为基础,利用Lagrange乘子,放松平衡方程和力边界条件对余能泛函的约束,推导出广义的余能原理.根据极分解定理,将变形分为刚性转动和纯变形两部分,则余能也包含相应的两部分,一部分与刚性转动有关,而另一部分与纯变形有关.使用线弹性本构关系,建立了可用于几何非线性计算的有限元模型.应用更新的Lagrange列式法,给出了增量形式的有限元公式.数值计算结果表明,该方法可用于浅曲粱的几何大变形计算.     

Note on the critical variational state in elasticity theory

Recently Prof. Chien Wei-zang pointed out that in certain cases, by means of ordinary Lagrange multiplier method, some of undetermined Lagrange multipliers may turn out to be zero during variation. This is a critical state of variation. In this critical state, the corresponding variational constraint can not be eliminated by means of simple Lagrange multiplier method. This is indeed the case when one tries to eliminate the constraint condition of strain-stress relation in variational principle of minimum complementary energy by the method of Lagrange multiplier.By means of Lagrange multiplier method, one can only derive, from minimum complementary energy principle, the Hellinger-Reissner Principle, in which only two type of in-dependent variables, stresses and displacements, exist in the new functional. Hence Prof. Chien introduced the high-order Lagrang multiplier method bu adding the quadratic terms.to original functions. The purpose of this paper is to show that by adding to original functionals one     

Classification of variational principles in elasticity

In this paper, variational principels in elasticity are classified according to the differences in the constraints used in these principles. It is shown in a previous paper [4] that the stress-strain relations are the constraint conditions in all these variational principles, and cannot be removed by the method of linear Lagrange multiplier. The other possible constraints are four of them: (1) equations of equilibrium, (2) strain-displacement relations, (3) boundary conditions of given external forces and (4) boundary conditions of given boundary displacements. In variational principles of elasticity, some of them have only one kind of such constraints, some have two kinds or three kinds of constraints and at the most four kinds of constraints. Thus, we have altogether 15 kinds of possible variational principles. However, for every possible variational principle, either the strain energy density or the complementary energy density may be used. Hence, there are altogether 30 classes of functional of variational principles in elasticity. In this paper, all these functionals are tabulated in detail.     

超细长弹性杆的分析力学问题

超细长弹性杆作为DNA等生物大分子链的力学模型，其平衡和稳定性问题已成为力学与分子生物学交叉的研究热点．虽然在Kirchhoff动力学比拟的基础上，用分析力学方法讨论弹性杆的文章已见诸文献，但尚未形成弹性杆分析力学的严格理论．本文研究了超细长弹性杆分析力学的若干基础性问题．对杆截面的自由度、虚位移、约束方程及约束力等基本概念给出严格的定义和表达式．建立弹性杆平衡的D’Alembert-Lagrange原理、Jourdain原理和Gauss原理；从D’Alembert-Lagrange原理导出Hamilton原理．从变分原理出发导出Lagrange方程、Nielsen方程、Appell方程和Hamilton正则方程；对于受约束的弹性杆，导出了带乘子的Lagrange方程．讨论了Lagrange方程的首次积分．对于杆中心线存在尖点的情形，导出了微段杆平衡的近似方程。