1) Limiting Coderivative
极限伴随导数
2) derivative and contigent derivative
导数和伴随导数
1.
In this paper, we obtain some necessary and sufficient optimality solutions in bilevel - multiobjective programming problem by using the concept of derivative and contigent derivative for set - valued functions introduced by [ 1].
本文利用[1]中所介绍的集值函数的导数和伴随导数的概念,对二层多目标决策模型的最优性,给出了两个充分条件和两个必要条件。
3) contingent epiderivatives
伴随上图导数
4) induced maximum
伴随极值
1.
Nagaraja and David have proven that if F\-1 satisfies the von\|Mises conditions and P(Y\-1≤A\-ny+B\-n|X\-1>a\-nx+b\-n)→H=(x,y),x,y∈R, then for some nondecreasing function I,P(Y (n,n) ≤A\-ny+B\-n)→ I(y) ,y∈R holds,where {Y (n,n) } denotes the induced maximum of {X\-n} .
F(1) 满足vonMises 条件而且P( Y1 ≤Any+ Bn X1 > anx + bn) →珡H(x ,y) ,x ,y ∈R,Nagaraja 和David 证明了对于伴随极值{ Y( n,n)} ,P( Y( n ,n) ≤Any+ Bn) →I(y) ,y∈R对某准d。
5) limits of derivatives
导数的极限
6) derivative limit
导数极限法
补充资料:对数导数
对数导数
logarithmic derivative
对数导数〔晌笋袱腼血血由a.e;‘呷砷桃叨c幽nPO,H3.。朋朋1 给定的函数的对数的导数.【补注】设f:〔a,b1~R是正函数,则它的对数导数等于(Inf),一专·张鸿林译
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