The definitions of two kinds of consistency of fuzzy judgment matrix are given first.
首先给出模糊判断矩阵的两种一致性的定义。
This method can be applied to interval judgment matrix with incomplete information and fuzzy judgment matrix.
另一方面,此方法还可以应用到判断信息不完全及判断信息是模糊数的情形。
The study makes it possible to effectively integrate experts′ preferences expressed by AHP judgment matrix and fuzzy judgment matrix in group decision making.
为群决策中有效集结专家的AHP判断矩阵和模糊判断矩阵这两种偏好提供了可行的途径。
In the second kind of approach, the priority weight vector is calculated directly from a (consistent) fuzzy judgment matrix or one with satisfactory consistency.
另一类方法是直接由一致性或具有满意一致性的模糊判断矩阵计算排序向量。
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。
Based on the consistent transformation formula, the logic relation of elements of fuzzy consistent complementary judgment matrix containing parameter with priority is pointed out.
基于一致性转换公式,揭示一种含参数的模糊互补判断矩阵的元素与优先权重新的逻辑关系。
The purpose of this paper is to study multi-attribute decision making on the basis of consistency of fuzzy complementary judgment matrix.
论文主要研究基于模糊互补判断矩阵一致性的多属性决策问题。
The method USES triangle fuzzy Numbers to establish judgment matrix and improves the unbalance problem of AHP's judgment matrix.
该方法采用三角模糊数来建立判断矩阵,改善了在层次分析法中所给出判断矩阵的不平衡问题。
The judgment matrix and the expert's evaluating matrix are constructed using fuzzy triangle Numbers, and the AHP method is improved.
采用三角模糊数来建立判断矩阵和专家评判矩阵,改进了AHP方法。
Fuzzy AHP was applied based on interval judgment matrix, and the fuzzy judgment model was set up for radar netting's effectiveness evaluation.
应用基于区间模糊数判断矩阵的模糊ahp法,建立了模糊评判模型。
The PPC model can avoid jamming of weight matrix in the method of fuzzy synthesize judgment, the model is concise, effective, feasible.
该模型简单、高效、可行,最大限度地避免了模糊综合评判等评标方法中权重的人为干扰。
Chapter 5 discuss some problems on fuzzy consistent judgment matrix of FAHP.
第五章探讨了基于模糊一致矩阵的FAHP的几个问题。
Chapter 5 discuss some problems on fuzzy consistent judgment matrix of FAHP.
第五章探讨了基于模糊一致矩阵的FAHP的几个问题。
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