1) semi bianalytic function
半双解析函数
1.
The definition of semi bianalytic functions is given,the relations of semi bianalytic functions with bianalytic and with semi analytic functions are discussed,and some relative theorems are obtained.
给出半双解析函数的定义,讨论了半双解析函数与双解析函数及半解析函数的关系,得出了有关定理。
2) Complete semi-bianalytic functions
完全半双解析函数
3) semi-analytic function
半解析函数
4) bianalytic function
双解析函数
1.
Hilbert boundary value problems of non normal type for bianalytic functions;
双解析函数非正则型Hilbert边值问题
2.
Discusses the stability and error estimate of the solution to the Riemann boundary value problem for homogeneous bianalytic functions, when the perturbation of boundary cure L occurs.
讨论了当区域边界 L发生微小的光滑摄动时 ,双解析函数的齐次 Riemann边值问题的解的稳定性 ,并给出误差估计 。
3.
In this paper,we study the Riemann boundary value problem for bianalytic function in smooth open curve.
研究双解析函数在光滑敞开曲线上的Riemann边值问题 利用解析函数Riemann边值问题的标准函数和特征双解析函数的Plemelj公式 ,得到了问题 (R)一般解的表示式 ,建立了问题 (R)的线性无关的个数与指标之间的关
5) bianalytic functions
双解析函数
1.
Riemann boundary value problems for bianalytic functions on infinite straight line;
无穷直线上的双解析函数的Riemann边值问题
2.
The stability of the general compound boundary value problem for bianalytic functions about boundary curve
双解析函数的一般复合边值问题关于边界曲线的稳定性
3.
Riemann boundary value problems for bianalytic functions on open segmental arc are investigated?The solvability of the problems is discussed ,and the theorems of solvability of the problems are obtained
研究双解析函数在开口弧段上的Riemann边值问题 ,讨论该边值问题的可解性 ,给出其可解性定
6) 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。
补充资料:Riemann-Hilbert问题(解析函数)
Riemann-Hilbert问题(解析函数)
Rionann-Hilbert problem (analytic functions)
Rien.口.·H刃帷rt问题(解析函数)【Ri~一Hi】bert脚咖舰(a回州c云.‘t加s);p.Maoa一介月诵epTa 3a-皿明a」 见解析函数论的边值问题(boundary铂】ue pro-blems of analytjc funetion此。ry).【补注】参考文献 【All Rodin,Yu .L.,The Riemann boundaryp拍blem on 凡~皿s盯faces,R配d,1988(译自俄文). 杨维奇译
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
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