2) sequential optimization of multi-parameters
多参数连续优化
3) continuous functions
连续函数
1.
This paper considers some properties of continuous functions.
该文讨论了周期连续函数的若干性质,刻画了一些函数集合之间的包含关系。
2.
This article extends the zero-point theorem for continuous functions from a closed interval to other types of intervals,and a series of zero-point theorems for continuous functions on relevant intervals are obtained,so that the theory on the zero-point theorem can be applied in more general cases.
将闭区间上连续函数的零点定理扩展到其它区间上,得到若干个相应区间上连续函数的零点定理,从而使零点定理理论更完善、应用更广泛。
3.
In this paper,Stancu-integral type operators are first constructed on simplexes,then discusseions on approximation to continuous functions are made.
本文首先构造了单纯形上积分型 Stancu算子 ,其次讨论了它对连续函数的逼近 。
4) continuous function
连续函数
1.
The inferences about the property for continuous function of closed interval and the mean value theorem for derivatives;
闭区间上连续函数的性质定理及微分中值定理的推论
2.
One quality of continuous function and its application in solving inequality equations;
连续函数的一个性质及其在解不等式中的应用
3.
Many ways have been given to solve the maximization problem of the continuous function, however, there are some drawbacks more or less.
求解连续函数最大值的优化算法已有多种,但都不同程度地存在一定的局限性。
5) continuous optimization
连续优化
1.
Research on continuous optimization algorithm based on swarm intelligence
基于群智能的连续优化算法研究
2.
Aiming at the singularity analysis of the Stewart platform,the determinant of the Jacobian matrix was selected as the objective function,and the continuous optimization problem was proposed in the workspace of parallel machine.
针对Stewart平台的奇异性分析,以雅可比矩阵行列式为目标函数,将奇异性分析问题转化为在并联机构可达工作空间内的连续优化问题。
3.
The ant colony algorithm has good adaptability when solving combined optimization problems,it isn t very good for continuous optimization problems.
蚁群算法在解决组合优化问题上有着良好的适应性,但直接应用于求解连续优化问题难以获得理想的效果。
6) real continuous function
连续实函数
1.
A sufficient condition is given for the special Mamdani fuzzy systems to uniformly approximate any real continuous function on a compact set.
在此基础上 ,进一步给出了特定 Mam dani模糊系统一致逼近紧致集上任意连续实函数的充分条
补充资料:半连续函数
半连续函数
semi-continuous function
半连续函数l肥l企伽血以朋仙盆七叨;noJlyllenpep曰-阳a:中押刘”,」 定义在完全度量空间X上的扩充实值函数f,称为在点为沂x是下(上)半连续的(lo忱r(印per)s咖一cont~us),如果 粤j(‘))f(动〔瓦f(‘)‘f(“。)]函数.厂称为在X上是下(上)半连续的,如果它在X的每个点都是下(上)半连续的.单调增加(减少)的函数列,其中每个函数都在点x。是下(上)半连续的,那么它们的极限函数在x。仍是下(上)半连续的.若“和v分别为X上的下半连续和上半连续函数,且对所有的xeX,。(x)簇u(x),。(劝>一二,以劝<+田,那么存在X上连续函数f,使得对一切x任x,满足条件。(幻蕊f(x)镬“(x).设拼是R“上的非负正则Bo闭测度,则对任何召可测函数.f:R”一R,存在两个单调函数序列道。。}和{叭小满足如下条件:l)u。和。。分别是下半连续和上半连续的;2)每个u。是有下界的,而每个。。是有上界的;3){u。}是减少的序列而道。,}是增加序列;4)对一切x, “。(x)).f(义))v。(x);5) 。峡u。(‘)一。叭v。(‘)=f(x)拜几乎处处成立;6)若f在EC=R”上为拼可和,且.f‘L:(E,料),则u。,v。‘L,(E,拜)且 厄J二“。一厩J·。“;!一丁.厂‘。 石EE(Vitali.(、份t反油如ry定理(vilali一e汕川话习创了t恤”-化m)).【补注】下半连续与上半连续常缩写为!.s.c.与u.s.c二l,s.c与u.s.c.函数的概念也可以在拓扑空间X上定义.任何一个连续函数族的上(相应地,下)包络是1 .s.c.(u.s.c)的,且当X为完全正则时,其逆亦真;若X可度量化,上述结果对连续函数的可数族也成立.所以,度量空间X上的半连续函数必属于第一助i此类(Ba此ck比es).其逆不真. 设X=R,又设 r一1当二
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