1) convex-closed set
凸闭集
1.
It is proved in this paper that, the reachable set of system, in which the state varible is linear and control varible is nonlinear, must be boundedly convex-closed set provided that the control domain is boundedly closed set.
严格证明了,当控制区域为有界闭集时,状态变量为线性而控制变量为非线性的系统的等时区域是有界凸闭集,从而用等时区域方法能彻底解决这类系统的时间最优控制问题。
2) weakly closed convex set
弱闭凸集
3) closed convex subset
闭凸子集
1.
Let X be a uniformly convex Banach space, E a closed convex subset of X and let T be self map on E.
又若X是一致凸的Banach空间,E是X的闭凸子集,T:E→E为自映射,对任意x0∈E,定义序列xn+1=(1-cn)xn+cnTxn,则迭代序列{xn}n∞=1若收敛于p,则p∈F(T)。
4) closed convex set
闭凸集
1.
Then,three equivalent theorems of continuous parameter set valued submartingale is proved:(1)L 1 wkc (X) valued submartingale is equal to ∫ ΩF τ 1 d p∫ ΩF τ 2 d p for any τ 1,τ 2∈T and τ 1<τ 2;(2)L 1 fc (X) valued submartingale is equal to S 1 F s (F s)cl{E(g/F s);g∈S 1 F t (F t)} for any s,t∈R + and s<t;(3)When X is separable,closed convex set valued subm.
继而证明了连续参数集值下鞅的三个等价定理:(a)L1wkc(X)值下鞅等价于任给τ1<τ2,τ1,τ2∈T,∫ΩFτ1dP∫ΩFτ2dP;(b)L1fc(X)值下鞅等价于任给s,t∈R+,s<t,S1Fs(Fs)cl{E(g|Fs),g∈S1Ft(Ft)};(c)X可分时,闭凸集值下鞅等价于任给s,t∈R+,s<t,A∈Fs,cl∫AFsdPcl∫AFtdP。
2.
Some important properties of multifacility location models are to be dealt with, and an optimality condition for multifacility location problem on a closed convex set is put forward.
主要讨论多场址模型的性质,并给出了闭凸集上多场址问题的最优性条件。
5) close convex subset
闭凸子集
6) Feng-closed convex sets
冯-闭凸集
补充资料:凸凸
1.高出貌。
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参考词条