Symmetric Kullback–Leibler distance based generalized grey target decision method for mixed attributes

IF 3.2 3区 工程技术 Q1 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS Grey Systems-Theory and Application Pub Date : 2024-06-04 DOI:10.1108/gs-01-2024-0001
Jinshan Ma, Hongliang Zhu
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Abstract

Purpose

The reported Kullback–Leibler (K–L) distance-based generalized grey target decision method (GGTDM) for mixed attributes is an asymmetric decision-making basis (DMB) that does not have the symmetric characteristic of distance in common sense, which may affect the decision-making result. To overcome the deficiency of the asymmetric K–L distance, the symmetric K–L distance is investigated to act as the DMB of GGTDM for mixed attributes.

Design/methodology/approach

The decision-making steps of the proposed approach are as follows: First, all mixed attribute values are transformed into binary connection numbers, and the target centre indices of all attributes are determined. Second, all the binary connection numbers (including the target centre indices) are divided into deterministic and uncertain terms and converted into two-tuple (determinacy and uncertainty) numbers. Third, the comprehensive weighted symmetric K–L distance can be computed, as can the alternative index of normalized two-tuple (deterministic degree and uncertainty degree) number and that of the target centre. Finally, the decision-making is made by the comprehensive weighted symmetric K–L distance according to the rule that the smaller the value, the better the alternative.

Findings

The case study verifies the proposed approach with its sufficient theoretical basis for decision-making and reflects the preferences of decision-makers to address the uncertainty of an uncertain number.

Originality/value

This work compares the single-direction-based K–L distance to the symmetric one and uses the symmetric K–L distance as the DMB of GGTDM. At the same time, different coefficients are assigned to an uncertain number’s deterministic term and uncertain term in the calculation process, as this reflects the preference of the decision-maker.

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基于对称库尔巴克-莱伯勒距离的混合属性广义灰色目标决策方法
目的 已报道的基于库尔贝克-莱布勒(K-L)距离的广义灰色目标决策方法(GGTDM)是一种非对称决策基础(DMB),不具有常识中距离的对称性,可能会影响决策结果。为了克服非对称 K-L 距离的不足,研究了对称 K-L 距离作为混合属性 GGTDM 的 DMB:首先,将所有混合属性值转换为二进制连接数,并确定所有属性的目标中心指数。其次,将所有二进制连接数(包括目标中心指数)分为确定项和不确定项,并转换为二元组(确定性和不确定性)数。第三,可以计算综合加权对称 K-L 距离,以及归一化二元组(确定度和不确定度)数和目标中心的替代指数。结论该案例研究验证了所提出的方法具有充分的决策理论依据,并反映了决策者在处理不确定数的不确定性时的偏好。同时,在计算过程中,为不确定数的确定项和不确定项分配了不同的系数,因为这反映了决策者的偏好。
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来源期刊
Grey Systems-Theory and Application
Grey Systems-Theory and Application MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-
CiteScore
4.80
自引率
13.80%
发文量
22
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