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Multistage decision making based on prioritization of hesitant multiplicative preference relations
Journal of Intelligent & Fuzzy Systems, 2017Hesitant multiplicative preference relation (HMPR) is a straightforward and efficient tool for representing hesitant fuzzy information in decision making. The aim of this paper is to develop a method to obtain priority vectors from HMPRs in the context of multistage decision-making (MSDM).
Lin, Yang +2 more
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International Journal of Information Technology & Decision Making, 2014
As we may have a set of possible values when comparing alternatives (or criteria), the hesitant fuzzy preference relation becomes a suitable and powerful technique to deal with this case. This paper mainly focuses on the multiplicative consistency of the hesitant fuzzy preference relation. First of all, we explore some properties of the hesitant fuzzy
HUCHANG LIAO, ZESHUI XU, MEIMEI XIA
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As we may have a set of possible values when comparing alternatives (or criteria), the hesitant fuzzy preference relation becomes a suitable and powerful technique to deal with this case. This paper mainly focuses on the multiplicative consistency of the hesitant fuzzy preference relation. First of all, we explore some properties of the hesitant fuzzy
HUCHANG LIAO, ZESHUI XU, MEIMEI XIA
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Journal of Intelligent & Fuzzy Systems, 2017
The hesitant fuzzy linguistic preference relations (HFLPRs) facilitate decision makers to express hesitant assessments in fuzzy decision making problems. It is important for the use of consistent HFLPRs since inconsistency leads to unreliable decision making results.
Liu, Hongbin, Jiang, Le, Xu, Zeshui
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The hesitant fuzzy linguistic preference relations (HFLPRs) facilitate decision makers to express hesitant assessments in fuzzy decision making problems. It is important for the use of consistent HFLPRs since inconsistency leads to unreliable decision making results.
Liu, Hongbin, Jiang, Le, Xu, Zeshui
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Information Sciences, 2020
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Zhang, Zhang Z., Chen, S.-M.
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Zhang, Zhang Z., Chen, S.-M.
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International Journal of Fuzzy Systems, 2020
Unlike other fuzzy modellings, probabilistic fuzzy sets can reflect clearly the importance of different numerical values. In group decision-making (GDM) problems, it is quite common for decision-makers (DMs) to elicit their knowledge with probabilistic hesitant fuzzy preference relations (PHFPRs), in which consistency adjustment and alternatives ...
Feifei Jin +4 more
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Unlike other fuzzy modellings, probabilistic fuzzy sets can reflect clearly the importance of different numerical values. In group decision-making (GDM) problems, it is quite common for decision-makers (DMs) to elicit their knowledge with probabilistic hesitant fuzzy preference relations (PHFPRs), in which consistency adjustment and alternatives ...
Feifei Jin +4 more
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2016 Chinese Control and Decision Conference (CCDC), 2016
Preference relations (PRs) are an effective tool to express people's opinions over alternatives. But it is usually difficult to give accurate information using crisp numbers. The main purpose of this paper is to propose the complementary triangular hesitant fuzzy preference relations (CTHFPRs) to solve the above correlative problem.
Hu Junhua, Yang Yan
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Preference relations (PRs) are an effective tool to express people's opinions over alternatives. But it is usually difficult to give accurate information using crisp numbers. The main purpose of this paper is to propose the complementary triangular hesitant fuzzy preference relations (CTHFPRs) to solve the above correlative problem.
Hu Junhua, Yang Yan
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Neural Computing and Applications, 2017
Hesitant multiplicative preference relations (HMPRs) are utilized to describe situations where a decision maker gives several possible values by Saaty’s 1-9 scale in pairwise comparison. For further applications of HMPRs, this paper develops two priority methods based on data envelopment analysis (DEA) for group decision making.
Yang Lin, Ying-Ming Wang
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Hesitant multiplicative preference relations (HMPRs) are utilized to describe situations where a decision maker gives several possible values by Saaty’s 1-9 scale in pairwise comparison. For further applications of HMPRs, this paper develops two priority methods based on data envelopment analysis (DEA) for group decision making.
Yang Lin, Ying-Ming Wang
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British Journal of Mathematics & Computer Science, 2014
Aims: The aim of this paper is to investigate interval -valued hesitant multiplicative preference relations and their application to multi-criteria decision making. Study Design: Based on pseudo-multiplication, we define some basic operations for the interval-valued hesitant multiplicative sets (IVHMSs) an d develop several aggregation operators for ...
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Aims: The aim of this paper is to investigate interval -valued hesitant multiplicative preference relations and their application to multi-criteria decision making. Study Design: Based on pseudo-multiplication, we define some basic operations for the interval-valued hesitant multiplicative sets (IVHMSs) an d develop several aggregation operators for ...
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Information Sciences
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Mengqi Li +3 more
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zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Mengqi Li +3 more
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A new procedure for hesitant multiplicative preference relations
International Journal of Intelligent Systems, 2018Fanyong Meng +3 more
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