1) partial differential inequality
偏微分不等式
2) differential inequality
微分不等式
1.
Applications of Differential Inequality in Several Nonlinear Boundary Value Problems;
微分不等式在若干非线性边值问题中的应用
2.
Two-point boundary value problems of second order Hammerstein type integro-differential-difference equation is studied by means of differential inequality theories.
利用微分不等式技巧研究了某一类二阶Hammerstein型积分微分差分方程的两点边值问题,在上下解存在的条件下,得到了解的存在性和唯一性定理。
3.
Two-point boundary value problems of second order mixed type integro-differential-difference equation is studied by means of differential inequality theories.
利用微分不等式技巧研究了某一类二阶混合型积分微分差分方程的两点边值问题,在上下解存在的条件下,得到了解的存在性和唯一性定理。
3) differential inequalities
微分不等式
1.
Second order neutral differential inequalities with delay and minimum;
含最小函数和时滞的二阶中立型微分不等式
2.
Miller and Mocanu[1] obtained a number of interesting differential inequalities by using second order differential subordination.
Miller和Mocanu[1]应用二阶微分从属理论得到不少有趣的微分不等式,本文改进了他们的一些结果,并推广了Nunokawa等[2]的主要定理以及Frasin和Darus[3]的一个结果。
3.
We prove some differential inequalities of random operator valued functions making use of Hahn Banach theorem and van Neumann theorem.
利用Hahn Banach定理和vonNeumann定理证明了关于随机算子值函数的微分不等
4) Hamilton-jacobin partial differential inequality(HJPDI)
汉密尔顿-雅可比偏微分不等式(HJPDI)
5) Hamilton-Jacobi partial differential inequation
哈密尔顿-雅可比偏微分不等式
6) differential difference inequality
微分差分不等式
1.
Based on the differential difference inequality and its related resultS in [1], a unified approach to get boundedness, stability and estimation of asymptotic orders for solutions of time-varying linear delay systems is presented.
基于文[1]中的微分差分不等式和有关结果,用统一的方法得到了有界性和稳定性的充分条件。
补充资料:偏微分
偏微分
partial differential
偏微分I俐血l曲阮n”丘目;”ac珊‘l应压”4洲卜peou班幼],多元函数的一阶 函数关于一个变量的微分(diflbrential),而保持其他变量固定.例如·设函数.厂(:、,…,x。)定义在点(川lj),…,x;。’)的某邻域内,则.厂关于变量x.在给定点的偏微分d、,f(二{“,,…,式。,)等于一元函数f(二、,、10,,…,x{o,)在x俨‘的常微分·即d二f(二{“,,】二,、沪)二试厂(:、、;罗’,二,二沪)}二,一二产二 _口j,_t〔1。…_(。。、,_ 一成~L义丫’,“,戈几”“关1所以旦乙=~丝卫… 刁x:dx、k(左>l)阶偏微分可类似地定义.例如,f(x、,…,x。)在点(x{0),…,x尸,)关于x,的k阶偏微分武f(;卿,二,,洲),正好是一元函数f(二,,‘男,…,x沪)关于其变量x、的k阶微分.因此, J*f‘,:。,..…二:。。、一典(二(。,,…,、乞。,)J、,, 口x‘ i二l,…,n;k=l,2,“’, Jl.八.K邓P只a邺B撰【补注】关于参考文献,见微分学(d迁免比ntial以Ia习璐)与微分(山价此ntial).王斯雷译
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