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Fuzzy Multi-criteria Decision-Making Using Neutrosophic Sets PDF

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Studies in Fuzziness and Soft Computing Cengiz Kahraman İrem Otay Editors Fuzzy Multi-criteria Decision-Making Using Neutrosophic Sets Studies in Fuzziness and Soft Computing Volume 369 Series editor Janusz Kacprzyk, Systems Research Institute, Polish Academy of Sciences, Warsaw, Poland e-mail: [email protected] The series “Studies in Fuzziness and Soft Computing” contains publications on various topics in the area of soft computing, which include fuzzy sets, rough sets, neural networks, evolutionary computation, probabilistic and evidential reasoning, multi-valuedlogic,andrelatedfields.Thepublicationswithin“StudiesinFuzziness and Soft Computing” are primarily monographs and edited volumes. They cover significant recent developments in the field, both of a foundational and applicable character. An important feature of the series is its short publication time and world-wide distribution. This permits a rapid and broad dissemination of research results. More information about this series at http://www.springer.com/series/2941 İ Cengiz Kahraman rem Otay (cid:129) Editors Fuzzy Multi-criteria Decision-Making Using Neutrosophic Sets 123 Editors CengizKahraman İrem Otay Department ofIndustrial Engineering Department ofIndustrial Engineering Istanbul TechnicalUniversity Istanbul OkanUniversity Macka, Istanbul,Turkey Akfirat-Tuzla, Istanbul,Turkey ISSN 1434-9922 ISSN 1860-0808 (electronic) Studies in FuzzinessandSoft Computing ISBN978-3-030-00044-8 ISBN978-3-030-00045-5 (eBook) https://doi.org/10.1007/978-3-030-00045-5 LibraryofCongressControlNumber:2018955177 ©SpringerNatureSwitzerlandAG2019 Thisworkissubjecttocopyright.AllrightsarereservedbythePublisher,whetherthewholeorpart of the material is concerned, specifically the rights of translation, reprinting, reuse of illustrations, recitation, broadcasting, reproduction on microfilms or in any other physical way, and transmission orinformationstorageandretrieval,electronicadaptation,computersoftware,orbysimilarordissimilar methodologynowknownorhereafterdeveloped. The use of general descriptive names, registered names, trademarks, service marks, etc. in this publicationdoesnotimply,evenintheabsenceofaspecificstatement,thatsuchnamesareexemptfrom therelevantprotectivelawsandregulationsandthereforefreeforgeneraluse. The publisher, the authors and the editors are safe to assume that the advice and information in this book are believed to be true and accurate at the date of publication. Neither the publisher nor the authorsortheeditorsgiveawarranty,expressorimplied,withrespecttothematerialcontainedhereinor for any errors or omissions that may have been made. The publisher remains neutral with regard to jurisdictionalclaimsinpublishedmapsandinstitutionalaffiliations. ThisSpringerimprintispublishedbytheregisteredcompanySpringerNatureSwitzerlandAG Theregisteredcompanyaddressis:Gewerbestrasse11,6330Cham,Switzerland I dedicate this book to my children; my daughter Nazlı Ece Kahraman; my son Yunus Emre Kahraman; and my son Onur Kahraman. Prof. Cengiz Kahraman I dedicate this book to my family; my dear grandparents Nazmiye Fero and Bayram Fero and my aunt Melek Fero; my lovely parents Cavit, Güzide and my brother Mustafa Yiğit. Asst. Prof. İrem Otay Preface Multiple-criteria decision-making(MCDM)isamodelingandmethodologicaltool fordealingwithcomplexengineeringproblems.Therearetwomainapproachesto MCDM problems: Multiple-attribute decision-making (MADM) and multiple- objective decision-making (MODM). MADM refers to making selections among some courses of action in the presence of multiple, usually conflicting, attributes. MADM problems are assumed to have a predetermined, finite number of decision alternatives. InMODM problems, thenumber of alternatives is effectively infinite, and the tradeoffs among the considered criteria are typically described by contin- uous functions. Very often in MCDM problems, data are imprecise and fuzzy. Fuzzy set approaches are especially suitable when modeling human knowledge is required. WhenordinaryfuzzysetswerefirstintroducedbyZadehin1965,thedefinitionsof membershipandnonmembershipfunctionshadbeendefinedsothattheirsumwas equal to 1.0. Later, these concepts became an attractive research area that many researchers focused on. These researchers determined the direction of the progress ofthefuzzysettheory.Intuitionisticfuzzysetsremovingthenecessitythatthesum must be equal to 1.0 have become the most attractive extension of ordinary fuzzy sets.Intuitionisticfuzzysetsletdecisionmakersincorporatetheirhesitancytotheir decisions so that the sum might be at most 1.0. Later, intuitionistic fuzzy sets of second type (IFS2) were introduced (Atanassov, 1999), providing a wider area for the assignment of membership and nonmembership degrees. In IFS2, the sum of squared membership and nonmembership degrees is at most equal to 1.0. Smarandache (1998) introduced neutrosophic sets as a generalization of intuition- istic fuzzy sets, incorporating a new parameter to the definition of a membership andnonmembershipconcepts.Thesumoftheindependentparameterscomposedof truth, indeterminacy, and falsity degrees can be between 0 and 3 in these sets. Especially after 2015, neutrosophic sets have attracted the interest of many researchers. Within the past 3 years, neutrosophic sets have been significantly improved by both theoretical works and practical works in the literature. vii viii Preface Thisbookinvolvestotally27chaptersunder4mainparts.Thefirstpartpresents anintroductiontoneutrosophicsets,whilethesecondpartisonthefundamentalsof neutrosophic set theory. Third part gives the preliminaries for neutrosophic multi-criteria decision-making and the last section includes representative theoret- ical and practical studies on neutrosophic multi-criteria decision-making. Chapter “A State-of-the-Art Review of Neutrosophic Sets and Theory” aims at classifying all these publications and to exhibiting the place of neutrosophic sets andlogicintheliterature.Tabularandgraphicalillustrationsareusedtosummarize the review results. Chapter “Arithmetic Operations of Neutrosophic Sets, Interval Neutrosophic Sets and Rough Neutrosophic Sets” presents the basic concepts of neutrosophic sets as well as some of their hybrid structures. Interval-valued neu- trosophic sets and rough neutrosophic set are also studied with some of their properties. Chapter “Power Harmonic Weighted Aggregation Operator on Single-Valued Trapezoidal Neutrosophic Numbers and Interval-Valued Neutrosophic Sets” introducesnewaggregationoperatorscalledpowerharmonicweightedaggregation operatorwithsingle-valuedtrapezoidalneutrosophicnumberandpowerharmonic weighted aggregation operator with interval-valued neutrosophic set. They are tested in MCDM and the results are compared. Chapter “Linear and Non-linear Neutrosophic Numbers” introduces neutrosophic numbers from different points of view. It defines different types of linear and nonlinear generalized neutrosophic numbers, which are very important for uncertainty theory. The different properties of that type of numbers are also discussed. Chapter “Rough Neutrosophic AggregationOperatorsforMulti-criteria Decision-Making”presentsabriefreview of decision-making in rough neutrosophic environment. It proposes two aggrega- tion operators namely, a rough neutrosophic arithmetic mean operator and a rough neutrosophic geometric mean operator and establishes the basic properties of the proposed operators. It develops four new neutrosophic multi-criteria decision- making methods by defining a cosine function to obtain the unknown criteria weights. Chapter “On Single Valued Neutrosophic Refined Rough Set Model and Its Application” introduce single-valued neutrosophic refined rough sets by com- bining single-valued neutrosophic refined sets with rough sets and further studies the hybrid model from two perspectives—constructive viewpoint and axiomatic viewpoint.Chapter “BipolarNeutrosophic Graphs”presentstheconcept ofbipolar neutrosophic graphs and discusses operations on bipolar neutrosophic graphs. It presentsthecertaincharacterizationofbipolarneutrosophicgraphsbylevelgraphs and their application to decision-making. Chapter “Properties of Interval-Valued Neutrosophic Graphs” introduces the properties of neutrosophic graphs for han- dling uncertainty and vagueness in attributes. It introduces the notion of interval-valued neutrosophic sets as a generalization of intuitionistic fuzzy sets, interval-valued fuzzy sets, interval-valued intuitionistic fuzzy sets, and single- valued neutrosophic sets. Chapter “Laplacian Energy of a Complex Neutrosophic Graph” extends the concept of energy of fuzzy graph, intuitionistic fuzzy graph, single-valued neutrosophic graph to the energy of complex neutrospohic graph. It defines the adjacency matrix of complex neutrosophic graph. The lower and upper Preface ix boundsfortheenergyofcomplexneutrosophicgrapharederived.Chapter“Matrix GameswithSimplifiedNeutrosophicPayoffs”aimsatdevelopingsomemodelsfor games,wherethepayoffsarerepresentedwithsimplifiedneutrosophicsets.Itgives anapplicationofsimplifiedneutrosophicsetstotwo-personzero-summatrixgames and introduces three solutions which are called neutrosophic saddle point method, neutrosophic upper and neutrosophic lower value method, and neutrosophic elim- ination method. Chapter “Similarity Measures in Neutrosophic Sets-I” aims to consider the various similarity measures such as distance-based similarity measure, tangent similarity measure, and vector similarity measure for single-valued neutrosophic sets (SVNS). In Chapter “Similarity Measures in Neutrosophic Sets-II”, SVNS are shifted to the interval-valued neutrosophic sets and the quadripartitioned single- valued neutrosophic sets. The chapter provides a complemental overview of the similaritymeasuresexistentintheoverallgeneralizedneutrosophictheory.Chapter “CorrelationCoefficientofNeutrosophicSetsandItsApplicationsinDecision-Making” presents the methods of correlation coefficient measures between two neutro- sophic sets, two interval-neutrosophic sets, and two neutrosophic refined sets. Furthermore, it presents some applications of these methods in multi-criteria decision-making problems. Chapter “A New Approach in Content-Based Image Retrieval Neutrosophic Domain” presents texture features for images embedded in the neutrosophic domain with hesitancy degrees. A hesitancy degree is the fourthcomponentofneutrosophicsets.Thegoalofthechapteristoextractasetof features to represent the content of each image in the training database to be used for the purpose of retrieving images from the database similar to the image under consideration. Chapter “Pareto Solution in Neutrosophic Set Setting for Multiple Criteria Decision Making Problems” investigates the multiple-criteria group decision-making problem with neutrosophic linguistic preference relations. A generalization of an aggregation operator in the decision-making problem is defined. Then, a neutrosophic Pareto solution is presented for the problems with linguisticpreferencerelations.Chapter“Three–WayBipolarNeutrosophicConcept Lattice” proposes a method for precise representation of bipolar information using the properties of bipolar neutrosophic sets. The hierarchical-order visualization of generated bipolar neutrosophic concepts and its interpretation are also discussed with an illustrative example. Chapter “Interval-Valued Neutrosophic Numbers with WASPAS” introduces interval-valued trapezoidal neutrosophic numbers for weighted aggregated sum product assessment (WASPAS). A simple case of classification of athletes in Paralympicsisrepresentedusinginterval-valuedtrapezoidalneutrosophicnumbers. Chapter “Interval-Valued Neutrosophic EDAS Method: An Application to Prioritization of Social Responsibility Projects” extends ordinary fuzzy evaluation based on distance from average solution (EDAS) method to interval-valued neu- trosophic EDAS for reflecting decision makers’ views to the truthiness (T), falsity (F), and indeterminacy (I). The proposed method is applied to the prioritization of multi-criteria and multi-expert social responsibility projects and a sensitivity analysis is conducted to check the robustness of the given decisions. x Preface Chapter“COPRASMethodwithNeutrosophicSets”developsanextendedformof complex proportional assessment (COPRAS) method used for solving the decision-makingproblemsinwhichallthedatapresentedbydecisionmakersarein theformofinterval neutrosophicnumbers.Inorder toaccomplishthisgoal,anew score function and an accuracy function that consider the decision maker’s risk attitudearedefined.Then,basedontheideaofMaclaurinsymmetricmeanoperator that can capture the interrelationships among multi-input arguments, some aggre- gation operators are defined, such as interval neutrosophic Maclaurin symmetric mean operator and interval neutrosophic-weighted Maclaurin symmetric mean operator. Chapter “Analytic Network Process with Neutrosophic Sets” develops analytic network process with neutrosophic sets. Based on the inner and outer dependencies, the weights of criteria and alternatives are calculated from neutro- sophic pairwise comparison matrices. Super matrix and limit matrix are also obtained.Chapter“NeutrosophicTOPSISwithGroupDecisionMaking”presentsa general overview about the development of technique for order preference by similarity to ideal solution (TOPSIS) under neutrosophic environment. It extends TOPSISmethodtosolvemulti-attributegroupdecision-makingproblemsbasedon single-valued neutrosophic sets and interval neutrosophic sets. Chapter “VIKOR Method for Decision Making Problems in Interval Valued Neutrosophic Environment” discusses the VIKOR method for solving MCDM problem with interval-valued neutrosophic numbers. It develops INNWAA and INNWGA operators under interval-valued neutrosophic environment. Chapter “Multiple Attribute Projection Methods with Neutrosophic Sets” presents the general pro- jection measure (PM) and bidirectional PM between two simplified neutrosophic sets(SNS),andthenaharmonicaveragingPMofSNSsisfurtherintroducedbased on two (bidirectional) projections. Chapter “An Integrated AHP & DEA Methodology with Neutrosophic Sets” proposes a new neutrosophic analytic hierarchy process (NAHP). Then, neutrosophic AHP is integrated with neutro- sophic DEA for bringing solutions to performance measurement problems. The inputs and outputs of DEA method are weighted by neutrosophic AHP. Chapter “Simple Additive Weighting and Weighted Product Methods Using Neutrosophic Sets” extends simple additive weighting (SAW) and weighted product methods (WPM) to their fuzzy versions by using neutrosophic sets. These sets not only handle the vagueness but also clarify indeterminacy of decision makers’ opinions. Chapter “Bipolar Complex Neutrosophic Sets and Its Application in Decision Making Problem” focuses on measuring uncertainty and its fluctuation using the propertiesofcomplexneutrosphicsets.Italsointroducesconnectionamongbipolar and complex neutrosophic sets to compute the similarity among bipolar complex neutrosophic sets. Chapter “Development of Fuzzy-Single Valued Neutrosophic MADM Technique to Improve Performance in Manufacturing and Supply Chain Functions”developsanewapproachformulti-attributedecision-making(MADM), whichworkswithconversiononcrisp/fuzzysetintosingle-valuedneutrosophicset. Theproposedapproachisappliedtoacase studyofselectionofautomatedguided vehicle (AGV) for flexible manufacturing cell in a given industrial application.

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