The best constant factor of one of guass ' integral inequalities and its generalization 积分不等式及其推广式的最佳值
A generalization of the hardy - hilbert type integral inequalities and its applications 型积分不等式的一个推广及其应用
On some nonlinear integral inequalities of the ou - iang type in n independent variables 个独立变元的欧阳型非线性积分不等式
Application of moment of the random variable in the inequality of integration ' s proof 随机变量的矩在证明积分不等式中的应用
In chapter one , some generalizations of several integral inequalities are obtained 第一章给出了几类积分不等式的推广形式。
The stability of a kind of nonlinear delay neutral differential systems based on a new integral inequality 基于一类积分不等式上的中立型时滞微分方程的稳定性
Some new results are established in section one , which generalize the important inequalities of bellman - bihari type 本章第一节给出了重要的bellman - bihari型积分不等式的一系列推广,得到了一些较好的结果。
In particular the energy decay of the solution is obtained by the use of komornik ' s integral inequality 特别地,我们利用komornik积分不等式得到弱解的能量衰减估计,其中a _ 1 , a _ 2和n为一些hilbert空间上的有界线性算子
These new improper integral inequalities are closely related with some integral inequalities proved by the present author in an earlier paper 这类含反常积分的非线性不等式与笔者以前证明的某些非线性积分不等式密切相关。
It is well known that the integral and finite difference inequalities play a fundamental role in the development of the theory of differential and finite difference equations 积分不等式和离散不等式在研究微分方程与有限差分方程理论过程中具有非常重要的作用。
