1) unilateral convex norm
一致凸范数
2) uniform norm
一致范数
1.
In this paper, we study the functional sample path properties for k-dimensional Brownian motion, and by the method of establishing large deviation formulas in topology of high-dimensional functions’s space generated by uniform norm, obtain the functional laws of iterated logarithm for k-dimensional Brownian motion.
利用了一致范数在高维连续函数空间生成的拓扑下建立大偏差公式的方法,获得了k-维Brown运动的泛函重对数定律。
3) uniformly convex function
一致凸函数
1.
The concepts such as locally uniformly convex function,compactly locally uniformly convex function and strong U-point are given.
将有关Banach空间中范数凸性的结果推广到一般的凸函数中去,给出了局部一致凸函数,紧局部一致凸函数,强U-点等概念,并详细讨论了各种凸函数之间的关系及点态性质。
2.
Under mild conditions, it is proved the global and saperlinear convergence of generalized Broyden s family withinexact line searches on uniformly convex function.
在较弱的条件下,对一致凸函数的无约束最优化问题,证明了带非精确线搜索的广义Broyden族的全局和超线性收敛性,而且在较弱的条件下,证明了Broyden族的全局和超线性收敛性。
4) locally uniformly
局部一致凸函数
1.
The concepts such as locally uniformly convex function,compactly locally uniformly convex function and strong U-point are given.
将有关Banach空间中范数凸性的结果推广到一般的凸函数中去,给出了局部一致凸函数,紧局部一致凸函数,强U-点等概念,并详细讨论了各种凸函数之间的关系及点态性质。
5) uniformly invex functions
一致不变凸函数
1.
Semicontinuity and uniformly invex functions;
半连续性与一致不变凸函数
2.
1,the author presented some criteria of uniformly invex functions under the conditions of upper semicontinuity and lower semicontinuity.
在文献[1]中,作者在上半连续和下半连续的条件下,给出了一致不变凸函数的几个判别准则。
6) univex(F_b,ρ)-functions
一致(Fb,ρ)-凸函数
补充资料:Luxemburg范数
Luxemburg范数
Luxemburg nonn
L峨曰血叱范数〔I一血叱~;J如盆c服6yP住肋p-Ma] 函数 ,‘x!.(M,一、{*:*>o,丁、(,一’x(:))‘:‘1}, G这里M(u)是关于正的u递增的偶凸函数, 怒“一’M(u)一忽u(M(u))一,一0,对“>0,M(“)>0,且G是R”中的有界集.此范数的性质曾由W.A.J.h以油比飞〔11作了研究.L~b鸣范数等价于O正ez范数(见0口厄空间(C旧允2 sP创芜)),且 I{x}I(,)簇1 lx}I,蕊2 11 x 11(、).如果函数M(u)和N(u)是互补(或互为对偶)的(见O市口类(Or比zc地”‘、则 ,,·,,(一sun{)·(!,,‘!,“!:,,,,,《一‘,}·如果z‘(t)是可测子集E CG的特征函数,则 !l:二11‘M、-一下尖二一. ““启”‘川M一’(l/n篮‘E)’
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参考词条