证明了高维离散系统的比较原理和时滞差分不等式。
A comparison principle and new delay difference inequality are presented for high dimensional discrete systems.
在分析数学中有些不等式的证明往往比较复杂,而且具体的直观含义也比较抽象。
In analysis mathematics, some identifications of inequalities are often more complicated, and concrete ocular meaning is more abstract.
文中给出了一个例子用来说明所提出的线性矩阵不等式方法并比较文献中已有结果。
An example is given to illustrate the proposed LMI approach and to compare the obtained results with those in the literature.
鉴于拟变分不等式求解比较困难,设计了基于混沌优化方法的启发式求解算法。
Since it is difficult to solve quasi-variation inequality, the paper designs a heuristic solution algorithm based on cha…
鉴于拟变分不等式求解比较困难,设计了基于混沌优化方法的启发式求解算法。
Since it is difficult to solve quasi-variation inequality, the paper designs a heuristic solution algorithm based on chaos met...
然后,将其与以前的不等式进行了比较。结果表明,新不等式比旧不等式更精细。
Then these inequalities with previous results were compared. The result showed that the new inequalities are the refinement of old ones.
然后,将其与以前的不等式进行了比较。结果表明,新不等式比旧不等式更精细。
Then these inequalities with previous results were compared. The result showed that the new inequalities are the refinement of old ones.
应用推荐