1) domain of regularity
正则域
2) regular domain
正则域
3) irregular region
非正则域
4) regular
正则
1.
The Nonexistence of (4,8)-Regular Maximal Planar Graph on 12 Vertives;
12阶的(4,8)-正则极大平面图的不存在性
2.
Study on the(k,l)-Regular Maximum Planar Graph on n>12;
阶n>12(k,l)-正则极大平面图
3.
On generalized Moore-Penrose inverses of regular morphisms;
关于正则态射的广义Moore-Penrose逆
5) regularity
正则
1.
An electrochemical machining problem is discussed and its regularity results of a free boundary is obtained.
主要讨论了一类电加工问题,得到其自由边界的有关正则性结果。
2.
A new family of symbolic function with special scaling coefficients was presented and it was verified by using recurrence,constructing and cut-supplement method that the wavelets constructed had a regularity index of order r+1 and the orthogonality.
给出一类尺度系数为固定排法的新的二元小波的符号函数,通过递推以及构造的思想,运用割补的方法验证所构造出的小波具有r+1阶正则指数及正交性。
3.
In this paper,a new regularity in L-fuzzy topological space is given.
研究了L-fuzzy拓扑空间中的正则问题,引入了一种新的正则,证明了这种正则有可乘性、L-好的推广、遗传性、拓扑不变性等重要性质。
6) regular *-
正则*-
1.
After introduce general information of inverse and regular semigroups, we survey the study works on the construction of regular semigroups with inverse transversals as well as on congruence lattices; summarize split transversal, orthodox transversal, regular *-transversal and adequate transversal, which were put forward recently as generalizations of inverse transversal.
总结了作为逆断面的推广的可裂断面,纯正断面,正则*-断面和恰当断面。
7) right π inverse a regular
a正则
8) holomorphy
正则
9) canonical and micro-canonical PACS number
正则和微正则
10) Tikhonov regularization
Tikhonov正则化
1.
Fourier and Tikhonov regularization methods for solving a class of backward heat conduction problems;
求解一类反向热传导问题的Fourier正则化和Tikhonov正则化方法
2.
Tikhonov regularization approach was used to alleviate the illness of inverse formula in(order) to get real solution or stable approximate solution.
在求解逆问题时,为了消除方程的病态,得到逆问题的真实解或其稳定近似解,采用了Tikhonov正则化方法对求解过程进行约束和控制。
3.
In this paper, the Tikhonov regularization method and the L-curve criterion for determing the regularization facto.
本文采用Tikhonov正则化算法和选取正则因子的L准则 ,对具有解析结果的波场变换方程进行了数值求解。
补充资料:超导电性的局域和非局域理论(localizedandnon-localizedtheoriesofsuperconductivity)
超导电性的局域和非局域理论(localizedandnon-localizedtheoriesofsuperconductivity)
伦敦第二个方程(见“伦敦规范”)表明,在伦敦理论中实际上假定了js(r)是正比于同一位置r的矢势A(r),而与其他位置的A无牵连;换言之,局域的A(r)可确定该局域的js(r),反之亦然,即理论具有局域性,所以伦敦理论是一种超导电性的局域理论。若r周围r'位置的A(r')与j(r)有牵连而影响j(r)的改变,则A(r)就为非局域性质的。由于`\nabla\timesbb{A}=\mu_0bb{H}`,所以也可以说磁场强度H是非局域性的。为此,超导电性需由非局域性理论来描绘,称超导电性的非局域理论。皮帕德非局域理论就是典型的超导电性非局域唯象理论。
说明:补充资料仅用于学习参考,请勿用于其它任何用途。
参考词条