1) strong E-convex function
强E-凸函数
1.
Strong E-convex set,strong E-convex function and strong E-convex programming;
强E-凸集,强E-凸函数和强E-凸规划
2) E-convex function
E-凸函数
1.
Strong E-convex set,strong E-convex function and strong E-convex programming;
强E-凸集,强E-凸函数和强E-凸规划
2.
On level sets of E-convex function and E-quasiconvex function
有关E-凸函数和E-拟凸函数的水平集
3) E-convex functions
E-凸函数
1.
Some new properties of their E-convex functions are discussed on the basis of the former researches,and their applications in optimization are researched,some of established Conclusions expanded,these functions perfected.
在已有研究基础上,对几类E-凸函数进行了研究,得出了它们的一些新性质,并研究了它们在最优化问题中的应用,推广了以前的部分结论,完善了这几类非凸函数。
2.
Recently a new criterion of quasi-semi-E-convex functions was introduced by Peng in 2006 for a new criterion of quisi-semi-E-convex functions.
最近,彭在文献[1]中提出了关于拟半E-凸函数的一个判别准则。
4) E-convex functions
E凸函数
5) semi-E-convex function
半-E-凸函数
1.
Furthermore,this theorem is generalized to the case of pseudo-semi-E-convex function and quasi-semi-E-convex function and the extent of its usage is enlarged.
对文献[2]中定理12进行研究,并在此基础上得到了一个判断不动点为最优解的必要条件,而且把该定理推广到了拟-半-E-凸函数与伪-半-E-凸函数的情形,拓展了该定理的应用范围。
2.
In the literature ,the two authors have studied E-convex sets,E-convex function and semi-E-convex function and obtained some properties of them.
文献[1,2]已对E-凸集,E-凸函数,半-E-凸函数进行了研究,得出了一些性质。
6) Pseudo-E-Convex functions
伪-E-凸函数
补充资料:凸函数
Image:11559688111252300.jpg
凸函数是一个定义在某个向量空间的凸子集c(区间)上的实值函数f
设f为定义在区间i上的函数,若对i上的任意两点x1,x2和任意的实数λ∈(0,1),总有
f(λx1+(1-λ)x2)≤λf(x1)+(1-λ)f(x2),
则f称为i上的凸函数.
判定方法可利用定义法、已知结论法以及函数的二阶导数
说明:补充资料仅用于学习参考,请勿用于其它任何用途。