1) analytical trial function method
解析试函数法
1.
Based on the analytical trial function method,a new beam-shell element is developed for the analysis of short-leg shear walls and tie-beams.
采用解析试函数法,利用广义协调元理论构造了一种适合短肢剪力墙和细长连梁结构分析的墙元。
2) analytical trial function
解析试函数
1.
An analytical trial function method (ATF) was developed based on the quadrilateral area coordinate system (QAC-II) for plane elements (ACATF).
在四边形面积坐标QAC-II的基础上,建立了弹性力学平面问题的面积坐标解析试函数方法。
2.
Based on the analytical trial functions,two 5-node membrane elements named ATFM5-I and ATFM5-II were proposed.
文章以解析试函数法作为工具,以弱式分片试验作为单元收敛判别标准,构造了两个五节点平面单元ATFM5-I和ATFM5-II。
3.
Based on the analytical trial functions,a 4-node 8 degrees-of-freedom generalized conforming plane element with internal parameters is developed in this paper.
利用解析试函数法构造一个内参型四结点八自由度广义协调膜元。
3) cosine function analytical method
余弦函数解析法
1.
It was showed that the cosine function analytical method had advantages that the method was more concise and object and it produced more accurate calculation results.
针对超静定杆结构节点位移的计算,引入了一类余弦函数解析法,进行分析和讨论,并与常规的能量法、位移图解法相比较,结果得出:此法具有数据结果准确,简明直观等优点。
4) semi-analytical weight function method
半解析权函数法
1.
This paper provides a semi-analytical weight function method to calculate the stress intensity factor, which is of interest for practical application (eg.
计算了不同裂纹长度和不同裂纹倾角的巴西圆盘的Ⅰ型和Ⅱ型应力强度因子,并将半解析权函数法计算结果与其它文献所提供的结果进行了比较,发现吻合较好。
5) The Theory of Pseudo-analytic Funtion
拟解析函数法
6) analytic function
解析函数
1.
On the deducing and the teaching of Cauchy-Rieman equations of analytic function;
论解析函数的Cauchy-Riemann条件的推导与教学
2.
Some properties of p-valents analytic functions with negative coefficients;
关于一类负系数p叶解析函数的某些性质
3.
A sufficient and necessary condition of the analytic function with the higher-order derivative;
解析函数的一个充要条件及高阶导数公式
补充资料:抽象解析函数
抽象解析函数
abstract analytic finction
抽象解析函数【a加的以.回ytiC血叹垃曰;侧.盯盯,.。。.中担叫.a6Cr洲灯幽],加mch宇回的解衍咚射(11n”-lytlcmappmgofBanachs声。粥) 由复B田益‘h空间X的某个区域D到复Bana(上空间y的在D中处处Fr峨元het可微的(di挽rent访bl“~司加名toFI,食11et)函数f(劝,即对于任何点a‘D,存在由X到y的有界线性算一子习‘(a,·),满足下列关系式: 妒爪“川!’·{/(a+h卜一f(a,一胡a,‘川二。,其中}}·{】表示X或Y上的范数;歼(a,h)称为函数f在点a上的Fr阮址t微分(R抚比tdi反代泊任吐). 另一种定义抽象解析函数概念的途径基于〔冶teaux可微性.由D到Y的函数f(x)称为在D中弱解析的(姗目y analytje),或在D中C饱抚么以可微的(由反卿血目ea叻川加gtoG劫eaux),如果对于空间Y上的每个连续线性泛函y’和每个元素h 6X,复函数夕’〔f(x十亡h))是复变量亡在圆盘】亡!
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参考词条