1) Variational integrals
多重积分-变分问题
2) multiobjective variational problem
多目标变分问题
1.
For a class of multiobjective variational problems containing arbitrary norms and Wolfe and Mond Weir type duals problems,under (F ρ) convexity assumptions on the objective and constraint functions involved, the weak and strong duality theorems are proved.
对一类包含任意范数的多目标变分问题(P)及其Wolfe和Mond-Weir型对偶,在对目标和约束函数的(F-ρ)-凸的假设下,证明了弱对偶和强对偶定理。
2.
Considering the Wolfe type and Mond Weir type duals for a class of multiobjective variational problems discussed in paper 1 ,a general dual of such a multiobjective variational problem was proposed,and the corresponding weak and strong duality theorems with respect to properly efficient solutions were proved.
考虑文章〔1〕讨论的一类多目标变分问题的Wolfe型和Mond-Weir型对偶,对这样一类多目标变分问题提出一种一般对偶,鉴于在建立对偶问题时,如果把Geofrion参数作为变量,讨论关于真有效解的对偶性定理存在许多问题,对于预定的Geofrion参数,证明了关于真有效解的相应弱对偶定理和强对偶定
3) Variational problem
变分问题
1.
Image denoising based on variational problem with interval biorthogonal wavelet;
基于变分问题的区间双正交小波的图像去噪
2.
Study of non-self-adjoint variational problem in low-frequency eddy current electromagnetic field;
低频涡流电磁场非自伴变分问题的研究
3.
Image denoising based on variational problem and generalized soft thresholding;
基于变分问题和广义软阈值的图像去噪
4) variational problems
变分问题
1.
The variational problems of the complete functional in calculus of variations are studied deperding on the arbitrary arguments,arbitrary multivariable functions and arbitrary-order partial derivatives of multivariable functions.
研究变分法中依赖于任意个自变量、任意个多元函数和任意阶多元函数偏导数的完全泛函的变分问题;提出并证明了完全泛函的变分问题的定理,采用偏微分算子,给出了完全欧拉方程组。
2.
In this paper,we did that and gave some forms about it and the application in variational problems.
文中把数学分析中的Green公式推广到了Sobolev空间中,并给出了几种常用形式及其在变分问题中的应用。
3.
The Lavrentiev phenomenon in variational problems is widely existent,but it is difficult to prove its existence strictly.
Lavrentiev现象在变分问题中是广泛存在的,严格地证明其存在性并不容易。
5) multiple integral
多重积分
1.
Using multiple integral to prove a generalization of Pythagoras theorem and to calculate the Moivre s integral.
利用多重积分证明毕达哥拉斯定理的一种推广和计算Movire积分。
2.
The Vandermondeian determinant of n real number are generalized, and the general computational formulas of the multiple integrals are derived, where, aixi< 1 ,xi>0,i = 1,2.
定义了与函数相关的Vandermonde行列式,从而得到了多重积分∫_Eφ~(n)(∑_(i=0)~na_ix_i)dx_1dx_2…dx_n的一般计算公式,其中E={(x_1,x_2,…,x_n)|∑_(i=1)~na_ix_i≤1,x_i≥0,i=1,2,…,n},x_0=1-∑_(i=1)~nx_i,并给出了若干特例。
3.
in this paper, using the mathematical induction, a class of compulational formulas for the multiple integral is proved.
得到了一类多重积分的计算公式,并运用数学归纳法给出了证明。
6) multiple integrals
多重积分
1.
Monte Carlo method by adopting uniform random number is a simple and effective way to calculate multiple integrals, its structure is simple and easy to program and debug.
采用均匀随机数蒙特卡罗法计算多重积分是一种简单而有效的方法,其程序结构简单,易于编制和调试。
补充资料:多重积分
多重积分
I
多重积分【m日ti沙抽峡,1;即aTB戚IIHTe印盯] 多变量函数的一种定积分.有几种不同的多重积分概念(R允rr以Im积分,此bes胖积分,玩比邵胆一Stie-ltjes积分,等等). 重Rien坦Lnn积分是以玉川白n测度(Jo宜坛n能a-s眠)拜为基础的.设E为n维E孤lid空间R”中的一Jo攻场n可测集,拌。为n维为已汕测度,并设:={E,})一,为E的一个分划,即一组Jorchn可测集E:,满足U卜:E。=E且拼。(E‘自E,)=0(i护j,i,j=1,…,n).令d(E。)表示E‘的直径,量 占:=n以xd(E,) f~.,,k称为分划:的网格(mesh of the paltjtion).若f(x)(x=(x.,‘·‘,x。”为在E上定义的函数,则任何形如 k a一‘·(f;亡‘”,“‘,“‘,)一各f(“‘,)。·(“,), 别‘)‘E“:的和称为函数f的Rjen旧田n积分和(R打nann inte脚1sUIn)·若lim‘,一。叮:存在且不依赖于特殊的分划序列,则此极限称为f在E上的n重Ri日比以nn积分(n~tup】eR七m田min唤归1)并记成 ff(二)d、或f…ff(二,..…二_、d:.…d二_. 若“E.函数f本身称为RIOrr以朋可积的(Rjen正比田illteg-mble)或简称R可积的(R一泊忱脚b」e). 当。
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