Aim To study new ranking methods of ranking problem on complementary judgment matrix with triangular fuzzy Numbers.
目的研究解决元素为三角模糊数的互补判断矩阵排序问题的新方法。
Moreover, a function for ranking fuzzy Numbers is proposed.
进而,引入一种新的模糊数排序函数。
Fuzzy linear programming with trapezoid fuzzy Numbers in restricted condition is transformed into classical linear programming by using a new ranking criterion, and an optimal solution is obtained.
利用一种新的模糊数排序准则,将约束条件中含有梯形模糊数的模糊线性规划转化为经典的线性规划,进而求得了原模糊线性规划的最优解。
A method for ranking fuzzy Numbers is applied to finding the optimal order quantity and the corresponding numerical examples are also given.
利用一种模糊数的排序法寻求最优订购量,并给出应用实例。
The operator is the extension of traditional OWA operator. It makes multiple triangle fuzzy Numbers aggregated by the ranking order.
该算子是对传统OWA算子的扩展,它使三角模糊数可根据其所在排序位置进行集结。
The operator is the extension of traditional OWA operator. It makes multiple triangle fuzzy Numbers aggregated by the ranking order. Characteristics of the FOWA are also analyzed.
该算子是对传统OWA算子的扩展,它使三角模糊数可根据其所在排序位置进行集结。
The operator is the extension of traditional OWA operator. It makes multiple triangle fuzzy Numbers aggregated by the ranking order. Characteristics of the FOWA are also analyzed.
该算子是对传统OWA算子的扩展,它使三角模糊数可根据其所在排序位置进行集结。
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