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Information Fusion 13 (2012) 31–47
Contents lists available at ScienceDirect
Information Fusion
journal homepage: www.elsevier .com/locate / inf fus
Entropy/cross entropy-based group decision making under intuitionisticfuzzy environment
Meimei Xia, Zeshui Xu ⇑School of Economics and Management, Southeast University, Nanjing 211189, China
a r t i c l e i n f o a b s t r a c t
Article history:Received 18 August 2009Received in revised form 12 November 2010Accepted 7 December 2010Available online 22 December 2010
Keywords:Intuitionistic fuzzy valuesWeight vectorEntropyCross entropyAggregation operatorGroup decision making
1566-2535/$ - see front matter � 2011 Published bydoi:10.1016/j.inffus.2010.12.001
⇑ Corresponding author.E-mail addresses: meimxia@163.com (M. Xia), xu_
We study the group decision making problem under intuitionistic fuzzy environment. Based on entropyand cross entropy, we give two methods to determine the optimal weights of attributes, and develop twopairs of entropy and cross entropy measures for intuitionistic fuzzy values. Then, we discuss the proper-ties of these measures and the relations between them and the existing ones. Furthermore, we introducethree new aggregation operators, which treat the membership and non-membership information fairly,to aggregate intuitionistic fuzzy information. Finally, several practical examples are presented to illus-trate the developed methods.
� 2011 Published by Elsevier B.V.
1. Introduction
Intuitionistic fuzzy set (IFS), as a generalization form of fuzzyset (FS), was introduced by Atanassov [1]. Since it assigns to eachelement a membership degree, a non-membership degree and ahesitancy degree, IFS is more powerful in dealing with vaguenessand uncertainty than FS. Since its appearance, IFS has attractedmore and more attentions from researchers. For example, Gauand Buehrer [2] gave the definition of vague set (VS), which wasshown to be equivalent to IFS by Bustince and Burillo [3]. Atanas-sov and Gargov [4] defined the notion of interval-valued intuition-istic fuzzy set (IVIFS) which is a generalization of IFS. More andmore authors have been giving the applications of IFS theory tomulti-attribute decision making in which there are two hot topics:(1) determine the weights of attributes; (2) aggregate the informa-tion for alternatives. For the first point, Li [5] constructed severallinear programming models to generate optimal weights for attri-butes by maximizing the comprehensive values of alternatives.Based on Li’s models [5], Lin et al. [6] proposed a much simplermodel to determine the weights of attributes. Wang et al. [7]extended Li’s idea [5] and proposed a similar framework to handlemulti-attribute decision making problems under interval-valuedintuitionistic fuzzy environment. Li et al. [8] constructed severalfractional programming models based on the TOPSIS method [9]to determine attribute weights. For the multi-attribute decision
Elsevier B.V.
zeshui@263.net (Z. Xu).
making problems in which the information about attribute weightsis incompletely known and the attribute values take the form ofintuitionistic fuzzy values (IFVs), Wei [10] established an optimiza-tion model based on the basic idea of traditional grey relationalanalysis (GRA). Ye [11] proposed a multi-attribute decision makingmethod with the information about attribute weights completelyunknown based on weighted correlation coefficients using entropyweights. Wei [12] established two optimization models to deter-mine attribute weights based on the maximizing deviation method[13,14] for dealing with situations where the information aboutattribute weights is completely or incompletely known.
For the second point, a lot of research has been done about theaggregation methods in the last decades [15–17], etc. Yager [18]gave the ordered weighted averaging (OWA) operator and thenextended it and proposed a class of generalized OWA (GOWA)operators [19]. Xu [20] developed some aggregation operators forIFVs, such as the intuitionistic fuzzy weighted averaging (IFWA)operator, intuitionistic fuzzy ordered weighted averaging (IFOWA)operator, intuitionistic hybrid aggregation (IFHA) operator andestablished various properties of these operators. Then Xu andYager [21] proposed some geometric aggregation operators forIFVs, such as the intuitionistic fuzzy weighted geometric (IFWG)operator, intuitionistic fuzzy ordered weighted geometric (IFOWG)operator, and intuitionistic hybrid geometric (IFHG) operator. Zhaoet al. [22] combined Yager’s operator and Xu’s operator and devel-oped some generalized aggregation operators, such as the general-ized intuitionistic fuzzy weighted averaging (GIFWA) operator,generalized intuitionistic fuzzy ordered weighted averaging
32 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
(GIFOWA) operator, and generalized intuitionistic fuzzy hybridaggregation (GIFHA) operator.
Although many weight-determining methods and aggregationoperators have been developed under intuitionistic fuzzy environ-ment, there are some issues to be pointed out: (1) The entropymeasure used in entropy weight method [11] is invalid in manysituations, and thus should be improved; (2) The TOPSIS method[8] may lose some original decision information due to that itneeds to translate the intuitionistic fuzzy decision matrix into aninterval-valued matrix; (3) To get more reasonable attributeweights, we should combine the existing weight-determiningmethods; (4) All the existing intuitionistic fuzzy aggregation oper-ators use different operational laws on membership and non-membership information, it is necessary to develop some neutraloperational laws about them due to that we are neutral in mostcases and want to be treated fairly. In order to avoid such issues,the rest of the paper is organized as follows. In Section 2, we givesome basic concepts; Section 3 develops a method to determinethe weights of attributes based on entropy and cross entropy; Sec-tion 4 proposes some new entropy and cross entropy measures.Section 5 gives some new intuitionistic fuzzy aggregation opera-tors. In Section 6, two examples are given to illustrate the proposedmethods; Section 7 gives some conclusions.
2. Basic concepts
Definition 2.1 [23]. Let X = {x1,x2, . . . ,xn} be fixed. A fuzzy set (FS)defined on X is given as:
A ¼ fðxi;lAðxiÞÞjxi 2 Xg ð1Þ
where the function lA(xi)(0 6 lA(xi) 6 1) is the membership degreeof xi to A in X.
Definition 2.2 [1]. Let X = {x1,x2, . . . ,xn} be fixed. An inuitionisticfuzzy set (IFS) A on X can be defined as:
A ¼ fðxi;lAðxiÞ; mAðxiÞÞjxi 2 Xg ð2Þ
where the functions lA(xi) and mA(xi) denote the membership degreeand non-membership degree of xi to A in X with the condition that
0 6 lAðxiÞ 6 1; 0 6 mAðxiÞ 6 1; lAðxiÞ þ mAðxiÞ 6 1 ð3Þ
and pA(xi) = 1 � lA(xi) � mA(xi) is called an intuitionitsic index (orhesitation degree) of xi to A.
For convenience, Xu [20] named the pair (la,ma) an intuitionis-tic fuzzy value (IFV) denoted as a with the condition 0 6 la, ma 6 1,la + ma 6 1. Especially, if la + ma = 1, then a reduces to (la,1 � la).Let �a ¼ ðma;laÞ be the complement of a, and V be the set of allIFVs.
Chen and Tan [24] introduced a score function s(a) = la � ma toget the score of a. Later, Hong and Choi [25] defined an accuracyfunction h(a) = la + ma to evaluate the accuracy degree of a. Basedon the score function s and the accuracy function h, Xu and Yager[21] gave an order relation between any two IFVs a and b:
If s(a) < s(b), then a < bIf s(a) = s(b), then
(i) If h(a) = h(b), then a = b(ii) If h(a) < h(b), then a < b
Two other important concepts for IFVs are entropy and crossentropy which have been applied to many areas, such as patternrecognition [26], image segmentation [27] and decision making[11], etc. Since its wide applications, a lot of work has been doneabout the entropy and cross entropy of FSs (or IFSs).
Entropy of a FS, first mentioned by Zadeh [28], is a useful tool tomeasure the fuzziness of information. Szmidt and Kacprzyk [29]extended the axioms of De Luca and Termini [30] and proposedthe following definition for an entropy measure on V.
Definition 2.3. An entropy on V is a real-valued function E:V ? [0,1], satisfying the following axiomatic requirements:
(1) E(a) = 0, if and only if a = (0,1) or a = (1,0);(2) E(a) = 1, if and only if la = ma;(3) E(a) 6 E(b), if la P lb P mb P ma or la 6 lb 6 mb 6 ma;(4) EðaÞ ¼ Eð�aÞ.
Cross entropy is used to measure the discrimination informa-tion, according to Shannon’s inequality [31], Vlachos and Sergiadis[27] gave a definition of intuitionsitic fuzzy cross entropy.
Definition 2.4. For two IFVs a and b, CE(a,b) is called a crossentropy between a and b, if the following conditions are satisfied:
(1) CE(a,b) P 0;(2) CE(a,b) = 0 if and only if a = b.
The above measures describe the entropy and cross entropy forIFVs. For IFSs A and B on X = {x1,x2, . . . ,xn}, the entropy and crossentropy can be given as:
EðAÞ ¼ 1n
Xn
i¼1
EðAiÞ ð4Þ
CEðA;BÞ ¼ 1n
Xn
i¼1
CEðAi;BiÞ ð5Þ
where Ai = (xi,lA(xi),mA(xi)) and Bi = (xi,lB (xi),mB(xi)) are IFVs,xi 2 X, i = 1,2, . . . ,n.
Vlachos and Sergiadis [27] showed that the entropy and crossentropy for IFSs degenerate to their fuzzy counterparts when IFSsbecome FSs. In fact, a FS A defined on X can be represented asA = {(xi,lA(xi),1 � lA(xi))jxi 2 X}. In other words, a FS can be consid-ered as a special case of an IFS, thus the entropy or cross entropyfor IFSs can also be suitable for FSs. Vlachos and Sergiadis [27] fur-ther defined the relationship between entropy and cross entropyfor IFSs which can also be true for IFVs:
Theorem 2.1. Let a be an IFV, then
EðaÞ ¼ �1t
CEða; �aÞ þ 1 ð6Þ
is an intuitionistic fuzzy entropy, and t is the normalization factor.
3. Method for intuitionistic fuzzy group decision making
An intuitionistic fuzzy group decision making problem can bedescribed as:
Let G = {G1,G2, . . . ,Gm} be the set of alternatives, C = {C1,C2, . . . ,Cn} the set of attributes, D = {D1,D2, . . . ,Ds} the set of decision mak-ers, and k = (k1,k2, . . . ,ks)T the weight vector of decision makers,where kk P 0, k = 1,2, . . . ,s, and
Psk¼1kk ¼ 1 (Due to that a decision
maker cannot be expected to have sufficient expertise to commenton all aspects of the problem but on a part of the problem for whichhe/she is competent [32], different decision makers should be as-signed different weights [33], especially in situations involvingpolicy specification. In the last decades, many methods have beendeveloped to determine the weights of decision makers [34–38].Usually, we should determine their weights according to theirknowledge, skills and experiences). Let RðkÞ ¼ ðaðkÞij Þn�m be an
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 33
intuitionistic fuzzy decision matrix, given by the decision makerDk, where aðkÞij ¼ ðl
ðkÞij ; m
ðkÞij Þ is an IFV for the alternative Ai with re-
spect to the attribute Cj provided by the decision maker Dk. Assumethat the weight vector of attributes, w = (w1,w2, . . . ,wn)T, is to beknown, with wj P 0, j = 1,2, . . .,n, and
Pnj¼1wj ¼ 1.
Sometimes, the information about attribute weights is com-pletely unknown or incompletely known because of time pressure,lack of knowledge or data, and the expert’s limited expertise aboutthe problem domain. To get the optimal alternatives, we shoulduse methods or optimal models to determine the weight vectorof attributes and use aggregation operators to aggregate all theindividual decision matrices, and then aggregate the attribute val-ues for each alternative to get the final ranking of alternativeswhich can be described as the following steps:
Step 1. Utilize models or methods to determine the weight vectorof attributes, w = (w1,w2, . . .,wn)T.
Step 2. Aggregate all the individual intuitionistic fuzzy decisionmatrices RðkÞ ¼ ðaðkÞij Þm�n (k = 1,2, . . . ,s) into a collectiveintuitionistic fuzzy decision matrix R = (aij)m�n by usingaggregation operators.
Step 3. Utilize aggregation operators to get the aggregated valueszi(i = 1,2, . . . ,m) of the alternatives Gi(i = 1,2, . . . ,m).
Step 4. Utilize the score function and the accuracy function to cal-culate the scores s(zi)(i = 1,2, . . . ,m) (i = 1,2, . . . ,m) andthe accuracy degrees h(zi)(i = 1,2, . . . ,m).
Step 5. Get the priority of alternatives by ranking s(zi) andh(zi)(i = 1,2, . . . ,m).
In Step 1, to determine the weights of attributes, several meth-ods have been developed, such as the TOPSIS method [8], maximiz-ing deviation method [10] and entropy method [11], but some ofthem need to translate the intuitionistic fuzzy decision matrix intoan interval-valued decision matrix [8] which may lose some origi-nal information; some of them only focus on the divergence ofalternatives [10] or only focus on entropy information of attributes[11], and the entropy measure used in the entropy method is notreasonable which will be discussed in Section 3. In the following,we propose a combined method to determine the weights of attri-butes based on the entropy and cross entropy.
For the decision maker Dk and the attribute Cj, the average crossentropy of the alternative Gi to all the other alternatives can begiven as:
1m� 1
Xm
l¼1
CE aðkÞij ;aðkÞlj
� �ð7Þ
and the overall cross entropy for the attribute Cj, which can bedescribed as the measure of divergence among all alternativesunder the attribute Cj, is given as:
Xs
k¼1
Xm
i¼1
kk1
m� 1
Xm
l¼1
CE aðkÞij ;aðkÞlj
� � !ð8Þ
If the performance values of each alternative have little differenceunder an attribute, then it shows that such an attribute plays asmall important role in the priority procedure and should be evalu-ated a small weight; Contrariwise, if an attribute makes the perfor-mance values have obvious difference, then such an attribute playsan important role in choosing the best alternative and should beassigned a bigger weight. Considering the entropy of attributes,the overall entropy of the attribute Cj is given as:
Xs
k¼1
Xm
i¼1
kkE aðkÞij
� �ð9Þ
According to the entropy theory, if the entropy value for an attri-bute is smaller across alternatives, it can provide decision makerswith the useful information. Therefore, the attribute should be as-signed a bigger weight; Otherwise, such an attribute will be judgedunimportant by most decision makers. In other words, such anattribute should be evaluated as a very small weight. Combiningthese two aspects, we have
Xs
k¼1
Xm
i¼1
kk1
m� 1
Xm
l¼1
CEðaðkÞij ;aðkÞlj Þ þ 1� EðaðkÞij Þ
� � !ð10Þ
Then the bigger the value of Eq. (10) is, the bigger weight we shouldassign to the attribute Cj.
If the information about attribute weights is completelyunknown, we can establish the following equations for determin-ing attribute weights:
wj ¼Ps
k¼1
Pmi¼1kk
1m�1
Pml¼1CEðaðkÞij ;a
ðkÞlj Þ þ 1� EðaðkÞij Þ
� �� �Pn
j¼1
Psk¼1
Pmi¼1kk
1m�1
Pml¼1CEðaðkÞij ;a
ðkÞlj Þ þ 1� EðaðkÞij Þ
� �� � ;j ¼ 1;2; . . . ;n ð11Þ
Due to the increasing complexity of practical decision situations,the decision makers may not be confident in providing exact valuesfor attribute weights. Instead, the decision makers may only possesspartial knowledge about attribute weights [39]. In such a case, let Hbe the set of incomplete information about attribute weights, to getthe optimal weight vector, the following model can be constructed:
ðMOD1Þ MaxEw ¼Xs
k¼1
Xn
j¼1
Xm
i¼1
kk1
m� 1
Xm
l¼1
CE aðkÞij ;aðkÞlj
� �
þ 1� E aðkÞij
� �� ��wj
s:t:w 2 H;Xn
j¼1
wj ¼ 1; wj P 0; j ¼ 1;2; . . . ;n
In Section 3, we will give some entropy, cross entropy measures tosupport the proposed weight- determining method.
4. Entropy/cross entropy pairs for intuitionistic fuzzy values
As for the uncertain measure of IFS, Burillo and Bustince [40]defined the distance measure between two IFSs and gave an axiomdefinition of intuitionistic fuzzy entropy and a theorem whichcharacterizes it. Szmidt and Kacprzyk [29] used a differentapproach from Burillo and Bustince [40] to introduce the non-probabilistic entropy measure for IFS based on the geometric inter-pretation of IFS and the distances between them. Hung [41] gavetwo entropy measures induced by distances between two IFSswhich were illustrated to be computed easily and could producereliable results. Hung and Yang [42] constructed J-divergence ofIFSs and introduced some useful distance and similarity measuresbetween two IFSs, and applied them to clustering analysis and pat-tern recognition. Vlachos and Sergiadis [27] introduced the con-cepts of discrimination information and cross entropy for IFSsand revealed the connection between the notions of entropies forFSs and IFSs in terms of fuzziness and intuitionism. Wang and Lei[43] constructed some entropy measures for IFSs. Zhang and Jiang[26] proposed two new entropy and cross entropy measures forVSs which are different from that of [43], and then applied themto pattern recognition and medical diagnosis. However, the exist-ing entropy measures for IFSs maybe invalid which will be dis-cussed in the following section. To avoid such a problem, wepropose some new entropy and cross entropy measures.
Fig. 1. Values of E1:2M ðaÞ.
Fig. 2. Values of E1:8M ðaÞ.
34 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
4.1. Entropy/cross entropy pair-1
Hung and Yang [42] gave the J-divergence of IFVs a and b asfollows:
Jpða; bÞ ¼1
p� 1lp
a þ lpb
2�
la þ lb
2
� �p(
þmp
a þ mpb
2� ma þ mb
2
� �p
þpp
a þ ppb
2� pa þ pb
2
� �p); 1 < p 6 2 ð12Þ
By Ref. [42], we know that 0 6 Jpða;bÞ 6 1p�1 1� 1
2p�1
� �. For conve-
nience, we can normalize it and define a cross entropy measure ofIFVs as:
CEpMða;bÞ ¼
1
1� 21�p
lpa þ lp
b
2�
la þ lb
2
� �p
þmp
a þ mpb
2
(
� ma þ mb
2
� �p
þpp
a þ ppb
2� pa þ pb
2
� �p); 1 < p 6 2
ð13Þ
By Ref. [42], it is easy to prove that CEpM a;bð Þ satisfies the conditions
(1), (2) in Definition 2.4, and it also satisfies the followingconditions:
(a) 0 6 CE(a,b) 6 1;(b) CE(a,b) = CE(b,a);(c) CE(a,b) 6 CE(a,c), CE(b,c) 6 CE(a,c), if la 6 lb 6 lc, ma P
mb P mc.
Especially, for an IFV b ¼ �a, by (3), we have
CEpMða; �aÞ ¼
1
1� 21�p
lpa þ mp
a
2� la þ ma
2
� �p
þ mpa þ lp
a
2
�
� ma þ la
2
� �p
þ ppa þ pp
a
2� pa þ pa
2
� �p�
¼ 21� 21�p
lpa þ mp
a
2� la þ ma
2
� �p� �
; 1 < p 6 2 ð14Þ
Based on Theorem 2.1, CEpMða; �aÞ can be used to measure the fuzzi-
ness of a, but it only considers the membership and non-member-ship information. Considering the hesitation information, we canreplace la and ma with la + pa and ma + pa (or 1 � ma and 1 � la) ,respectively, in Eq. (14) and give a new entropy measure:
EpMðaÞ ¼
21� 21�p
1� la þ 1� ma
2
� �p
� ð1� laÞp þ ð1� maÞp
2
� �þ 1; 1 < p 6 2 ð15Þ
Figs. 1 and 2 depict the entropy of EpM að Þ (1 < p 6 2) when p = 1.2
and p = 1.8, the color of each point (la,ma) on the simplex denotesthe entropy value of the IFV a = (la,ma). As the divergence of laand ma becomes bigger, both the values of E1:2
M ðaÞ and E1:8M ðaÞ become
smaller, and it is obvious that the values of E1:2MðaÞ are no smaller
than those of E1:8M ðaÞ.
Theorem 4.1. The mapping defined by Eq. (15) is an intuitionisticfuzzy entropy.
The Proof of Theorem 3.1 is provided in Appendix A.
4.2. Entropy/cross entropy pair-2
For two IFVs a and b, Vlachos and Sergiadis [27] gave the crossentropy measure:
CEvsða;bÞ ¼ 2la ln la þ lb ln lb
2�
la þ lb
2ln
la þ lb
2
�
þ ma ln ma þ mb ln mb
2� ma þ mb
2ln
ma þ mb
2
�ð16Þ
Hung and Yang [42] gave the J-divergence of IFVs:
CEhyða;bÞ ¼la ln la þ lb lnlb
2�
la þ lb
2ln
la þ lb
2
þ ma ln ma þ mb ln mb
2� ma þ mb
2ln
ma þ mb
2
þ pa ln pa þ pb lnpb
2� pa þ pb
2ln
pa þ pb
2ð17Þ
By analyzing CEvs(a,b) and CEhy(a,b), we can find that CEvs does notconsider the hesitation degree, and both the above cross entropymeasures are invalid when one of the values la, ma, pa, lb, mb andpb are zero, moreover, they are not normalized. To avoid such is-sues, based on Ref. [44], we give a revised form:
Fig. 4. Values of E1NðaÞ.
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 35
CEqNða;bÞ ¼
1Tð1þ qlaÞ lnð1þ qlaÞ þ ð1þ qlbÞ lnð1þ qlbÞ
2
�
�1þ qla þ 1þ qlb
2ln
1þ qla þ 1þ qlb
2
þ ð1þ qmaÞ lnð1þ qmaÞ þ ð1þ qmbÞ lnð1þ qmbÞ2
� 1þ qma þ 1þ qmb
2ln
1þ qma þ 1þ qmb
2
þ ð1þ qpaÞ lnð1þ qpaÞ þ ð1þ qpbÞ lnð1þ qpbÞ2
� 1þ qpa þ 1þ qpb
2ln
1þ qpa þ 1þ qpb
2
�; q > 0
ð18Þ
where T = (1 + q)ln(1 + q) � (2 + q)(ln(2 + q) � ln2). T is a function ofq, when q > 0. T increases as q(q > 0) increases and obtains its min-imum value 0 at q = 0 (see Fig. 3)
Theorem 4.2. The mapping defined by Eq. (18) is an intuitionisticfuzzy cross entropy, and satisfies the conditions (a)–(c) given inSection 3.1.
The Proof of Theorem 4.2 is provided in Appendix A.Let b ¼ �a, we have
CEqNða; �aÞ ¼
1Tð1þ qlaÞ lnð1þ qlaÞ þ ð1þ qmaÞ lnð1þ qmaÞ
2
�
� 1þ qla þ 1þ qma
2ln
1þ qla þ 1þ qma
2
þ ð1þ qmaÞ lnð1þ qmaÞ þ ð1þ qlaÞ lnð1þ qlaÞ2
� 1þ qma þ 1þ qla
2ln
1þ qma þ 1þ qla
2
þ ð1þ qpaÞ lnð1þ qpaÞ þ ð1þ qpaÞ lnð1þ qpaÞ2
� 1þ qpa þ 1þ qpa
2ln
1þ qpa þ 1þ qpa
2
�
¼ 1Tð1þ qlaÞ lnð1þ qlaÞ þ ð1þ qmaÞ lnð1þ qmaÞ�� 1þ qla þ 1þ qmaÞ ln
1þ qla þ 1þ qma
2
� �; q > 0
ð19Þ
Fig. 3. The function of T = (1 + q)ln(1 + q) � (2 + q)(ln (2 + q) � ln2).
where T = (1 + q)ln(1 + q) � (2 + q)(ln(2 + q) � ln2).Similar to Ep
MðaÞ, we replace la and ma with 1 � ma and 1 � la inEq. (19), and define another entropy measure:
EqNðaÞ ¼ �
1Tðð1þ qð1� laÞÞ lnð1þ qð1� laÞÞ
þ ð1þ qð1� maÞÞ lnð1þ qð1� maÞÞ � ð1þ qð1� laÞþ 1þ qð1� maÞÞðlnð1þ qð1� laÞ þ 1þ qð1� maÞÞ � ln 2ÞÞþ 1; q > 0 ð20Þ
where T = (1 + q)ln(1 + q) � (2 + q)(ln(2 + q) � ln2).Figs. 4 and 5 depict the entropy of Eq
NðaÞ (q > 0) when q = 1 andq = 10, the color of each point (la,ma) on the simplex denotes theentropy value of the IFV a = (la,ma). As the divergence of la andma becomes bigger, the values of E1
NðaÞ and E10N ðaÞ become smaller,
and we can find that the values of E1NðaÞ are no bigger than those of
E10N ðaÞ.
Fig. 5. Values of E10N ðaÞ.
Table 1Comparison of the fuzziness with different entropy measures under A.
A1/2 A A2 A3 A4
Ezl 0.41560 0.4200 0.2380 0.15460 0.1217Eza 0.3210 0.3440 0.1970 0.1330 0.0980Ezb 0.4160 0.4200 0.2380 0.1550 0.1220Ezc 0.3340 0.3200 0.1400 0.0610 0.0280Ezd 0.2780 0.2460 0.1190 0.0560 0.0270Eze 0.3750 0.3700 0.1890 0.1080 0.0750Ebb 0.4090 0.5000 0.4900 0.4670 0.4670Esk 0.3450 0.3740 0.1970 0.1310 0.1090
E2hc
0.3420 0.3440 0.2610 0.1990 0.1610
Es 0.4330 0.4310 0.3270 0.2530 0.2080E 0.5518 0.5217 0.3491 0.2357 0.1417
36 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
Theorem 4.3. The mapping defined by Eq. (20) is an intuitionisticfuzzy entropy.
The Proof of Theorem 4.3 is provided in Appendix A.
4.3. Comparative examples
For interval valued fuzzy sets (IVFSs), Zeng and Li [45] gave anentropy measure Ezl, Zhang et al. [46] defined five entropy mea-sures Eza, Ezb, Ezc, Ezd and Eze. We can develop the correspondingentropies on IVFSs by the relationship between IVFSs and IFSs.
For an IFS A on X = {x1,x2, . . . ,xn}, let Ai = (xi,lA(xi),mA(xi)) andBi = (xi,lB(xi),mB(xi)), then
EzlðAÞ ¼ 1� 1n
Xn
i¼1
jlAi� mAi
j ð21Þ
EzaðAÞ ¼ 1�
ffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi2n
Xn
i¼1
ðjlAi� 0:5j2 þ j1� mAi
� 0:5j2Þ
vuut ð22Þ
EzbðAÞ ¼ 1� 2n
Xn
i¼1
ðjlAi� 0:5j þ j1� mAi
� 0:5jÞ ð23Þ
EzcðAÞ ¼ 1� 2n
Xn
i¼1
maxðjlAi� 0:5j; j1� mAi
� 0:5jÞ ð24Þ
EzdðAÞ ¼ 1�
ffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffiffi4n
Xn
i¼1
maxðjlAi� 0:5j2; j1� mAi
� 0:5j2Þ
vuut ð25Þ
EzeðAÞ ¼ 1� 2n
Xn
i¼1
jlAi� 0:5j þ j1� mAi
� 0:5j4
þmaxðjlAi
� 0:5j þ j1� mAi� 0:5Þ
2
�ð26Þ
Burillo and Bustince [47] defined an intuitionistic fuzzy entropyEbb(A). Szmidt and Kacprzyk [29] suggested an entropy as Esk(A).Hung and Yang [48] proposed two intuitionistic fuzzy entropiesE2
hcðAÞ and Es(A). Vlachos and Sergiadis [27] gave an entropy mea-sure Evs(A). Zhang and Jiang [26] gave an entropy measure Ezj(A)which can be listed below:
EbbðAÞ ¼1n
Xn
i¼1
ð1� lAi� mAi
Þ ð27Þ
EskðAÞ ¼1n
Xn
i¼1
lAi^ mAi
þ pAi
lAi_ mAi
þ pAi
¼ 1n
Xn
i¼1
ðlAiþ pAi
Þ ^ ðmAiþ pAi
ÞðlAiþ pAi
Þ _ ðmAiþ pAi
Þ
¼ 1n
Xn
i¼1
ð1� mAiÞ ^ ð1� lAi
Þð1� mAi
Þ _ ð1� lAiÞ ð28Þ
E2hcðAÞ ¼
1n
Xn
i¼1
1� l2Ai� m2
Ai� p2
Ai
� �ð29Þ
EsðAÞ ¼ �1n
Xn
i¼1
ðlAilnlAi
þ mAiln mAi
þ pAilnpAi
Þ ð30Þ
EvsðAÞ ¼ �1
ln 2
Xn
i¼1
lAiln lAi
þ mAiln mAi
� ðlAiþ mAi
Þ lnðlAi
�þ mAi
Þ � pAiln 2
�ð31Þ
EzjðAÞ ¼1n
Xn
i¼1
lAi^ mAi
lAi_ mAi
ð32Þ
vsEzj 0.2851 0.3050 0.1042 0.0383 0.0161
E1:2M
0.5854 0.5809 0.4481 0.3480 0.2843
E1:5M
0.5680 0.5572 0.4128 0.3111 0.2509
E1:8M
0.5556 0.5394 0.3856 0.2824 0.2253
E1N
0.5561 0.5409 0.3887 0.2860 0.2287
E20N
0.5831 0.5793 0.4461 0.3460 0.2816
E100 0.5940 0.5931 0.4658 0.3662 0.3006
Example 4.1 [26]. Let A = {(xi,lA(xi),mA(xi))jxi 2 X} be an IFS inX = {x1,x2, . . . ,xn}. For any positive real number n, De et al. [49]defined the IFS An as follows:
An ¼ fðxi; ½lAðxiÞ�n;1� ½1� mAðxiÞ�nÞjxi 2 Xg ð33Þ
We consider the IFS A in X = {6,7,8,9,10} defined as:
A ¼ fð6;0:1;0:8Þ; ð7;0:3;0:5Þ; ð8;0:5;0:4Þ; ð9;0:9;0:0Þ; ð10;1:0;0:0Þg
By taking into account the characterization of linguistic vari-ables, De et al. [49] regarded A as ‘‘LARGE’’ in X. Using the aboveoperations, we have
A1/2 may be treated as ‘‘More or less LARGE’’,A2 may be treated as ‘‘Very LARGE’’,A3 may be treated as ‘‘Quite very LARGE’’,A4 may be treated as ‘‘Very very LARGE’’.
We use these IFSs to compare the above entropy measures, thecomparison results are presented in Table 1. From the viewpoint ofmathematical operations, the entropies of these IFSs have the fol-lowing requirement [48]:
EðA1=2Þ > EðAÞ > EðA2Þ > EðA3Þ > EðA4Þ ð34Þ
Based on Table 1, we see that the entropy measures Ezc, Ezd, Eze, Es
and Evs satisfy (34), but
EzlðAÞ > EzlðA1=2Þ > EzlðA2Þ > EzlðA3Þ > EzlðA4ÞEzaðAÞ > EzaðA1=2Þ > EzaðA2Þ > EzaðA3Þ > EzaðA4ÞEzbðAÞ > EzbðA1=2Þ > EzbðA2Þ > EzbðA3Þ > EzbðA4ÞEbbðAÞ > EbbðA2Þ > EbbðA3Þ ¼ EbbðA4Þ > EbbðA1=2ÞEskðAÞ > EskðA1=2Þ > EskðA2Þ > EskðA3Þ > EskðA4ÞE2
hcðAÞ > E2hcðA
1=2Þ > E2hcðA
2Þ > E2hcðA
3Þ > E2hcðA
4ÞEzjðAÞ > EzjðA1=2Þ > EzjðA2Þ > EzjðA3Þ > EzjðA4Þ
Our proposed entropy measures indicate that
EpMðA
1=2Þ > EpMðAÞ > Ep
MðA2Þ > Ep
MðA3Þ > Ep
MðA4Þ;
p ¼ 1:2;1:5;1:8; 0 < p 6 2
EqNðA
1=2Þ > EqNðAÞ > Eq
NðA2Þ > Eq
NðA3Þ > Eq
NðA4Þ;
q ¼ 1;20;100; q > 0
Therefore, the performances of Ezc; Ezd; Eze; Es; Evs; EpM
ðp ¼ 1:2;1:5;1:8;0 < p 6 2Þ and EqNðq ¼ 1;20;100; q > 0Þ are good,
but the performances of Ezl; Eza; Ezb; Ebb; Esk; E2hc and Ezj are poor.
For Example 4.1, Figs. 6 and 7 give more details about the entro-py measures Ep
M ð1 < p 6 2Þ and EqN ðq > 0Þ as the parameter
p(1 < p 6 2) and q (q > 0) change. From Figs. 6 and 7, it is noted
N
Fig. 6. Values of EpMð1 < p 6 2Þ in Example 4.1.
Fig. 7. Values of EpNðq > 0Þ in Example 4.1.
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 37
that EpM ð1 < p 6 2Þ decreases as the parameter p(1 < p 6 2) in-
creases, while EqN ðq > 0Þ increases as the parameter q (q > 0)
increases.
Example 4.2 [50]. Assume that ai (i = 1,2,3,4) represent fourhouses we consider to buy:
a1 ¼ ð0:7;0:3Þ; a2 ¼ ð0:6;0:2Þ; a3 ¼ ð0:5;0:1Þ; a4 ¼ ð0:4;0Þ
Table 2Comparison of the fuzziness with different entropy measures under a.
a1 a2 a3 a4
Ezl 0.6000 0.6000 0.6000 0.6000Eza 0.6000 0.5528 0.4343 0.2789Ezb 0.6000 0.6000 0.6000 0.4000Ezc 0.6000 0.4000 0.2000 0.0000
Ezd 0.6000 0.4000 0.2000 0.0000
Eze 0.6000 0.4000 0.2000 0.2000
Ebb 0.0000 0.2000 0.4000 0.6000
Esk 0.4300 0.5000 0.5600 0.6000
E2hc
0.4200 0.5600 0.5800 0.4800
On the one extreme, for the house a1,70% of attributes havedesirable values, and 30% of attributes have undesirable values.On the other extreme, for the house a4 we only know that it has40% desirable attributes and 60% of attributes are indeterminate.So we intuitively feel that it is easier to classify the house a1 tothe set of those fulfilling (worth buying) our demands than toclassify the house a4 to the set of houses unfulfilling ourdemands.
Intuitively, the entropy of them should be
Eða1Þ < Eða2Þ < Eða3Þ < Eða4Þ ð35Þ
We use ai (i = 1,2,3,4) to compare the above measure entropies.The results are listed in Table 2, based on which we see that Ebb
and Esk satisfy (33), but
Ezlða1Þ ¼ Ezlða2Þ ¼ Ezlða3Þ ¼ Ezlða4Þ; Ezaða1Þ > Ezaða2Þ > Ezaða3Þ > Ezaða4Þ
Ezbða1Þ > Ezbða2Þ > Ezbða3Þ > Ezbða4Þ; Ezcða1Þ > Ezcða2Þ > Ezcða3Þ > Ezcða4Þ
Ezdða1Þ > Ezdða2Þ > Ezdða3Þ > Ezdða4Þ; Ezeða1Þ > Ezeða2Þ > Ezeða3Þ > Ezeða4Þ
E2hcða3Þ > E2
hcða2Þ > E2hcða4Þ > E2
hcða1Þ; Esða2Þ > Esða3Þ > Esða4Þ > Esða1Þ
Evsða1Þ > Evsða2Þ > Evsða3Þ > Evsða4Þ; Ezjða1Þ > Ezjða2Þ > Ezjða3Þ > Ezjða4Þ
Our entropy measures indicate that
EpMða4Þ > Ep
Mða3Þ > EpMða2Þ > Ep
Mða1Þ; p ¼ 1:2;1:5;1:8; 0 < p 6 2
EqNða4Þ > Eq
Nða3Þ > EqNða2Þ > Eq
Nða1Þ; q ¼ 1;20;100; q > 0
Therefore, the performances of Ebb; Esk; EpM ðp ¼ 1:2;1:5;1:8;0 <
p 6 2Þ and EqNðq ¼ 1;20;100; q > 0Þ are good, but the performances
of Ezl; Eza; Ezb; Ezc; Ezd; Eze; E2hc; Es; Evs and Ezj are poor.
More results about the entropy measures EpM ð1 < p 6 2Þ and
EqN ðq > 0Þ in Example 4.2 can be found in Figs. 8 and 9 , it is noted
that EpM ð1 < p 6 2Þ decreases as the parameter p(1 < p 6 2) in-
creases, while EqN ðq > 0Þ increases as the parameter q (q > 0)
increases.From the above two examples, we can conclude that the perfor-
mances of EpMð1 < p 6 2Þ; Eq
Nðq > 0Þ are better than the existing en-tropy measures.
Example 4.3 [42,51–54]. Assume that there are three patternsdenoted with IFVs in X = {x1,x2,x3}. These three patterns aredenoted as follows:
A1 ¼ fðx1;0:1;0:1Þ; ðx2;0:5;0:1Þ; ðx3;0:1;0:9Þg;A2 ¼ fðx1;0:5;0:5Þ; ðx2;0:7;0:3Þ; ðx3;0:0;0:8Þg;A3 ¼ fðx1;0:7;0:2Þ; ðx2;0:1;0:8Þ; ðx3;0:4;0:4Þg:
Assume that a sample B = {(x1,0.4,0.4), (x2,0.6,0.2), (x3,0.0,0.8)} isgiven. Then by using the developed cross entropy measures pro-posed in Section 4.2, we can obtain
a1 a2 a3 a4
Es 0.6109 0.9503 0.9433 0.6731Evs 0.8813 0.8490 0.7900 0.6002Ezj 0.4286 0.3333 0.2000 0.0000
E1:2M
0.8682 0.8869 0.9004 0.9107
E1:5M
0.8536 0.8668 0.8769 0.8850
E1:8M
0.8440 0.8498 0.8544 0.8583
E1N
0.8426 0.8525 0.8612 0.8689
E20N
0.8669 0.8881 0.9034 0.9150
E100N
0.8762 0.8974 0.9123 0.9233
Fig. 8. Values of EpM ð1 < p 6 2Þ in Example 4.2.
Fig. 9. Values of EqNðq > 0Þ in Example 4.2.
Fig. 10. Values of CEpMð1 < p 6 2Þ in Example 4.3.
Fig. 11. Values of CEqNðq > 0Þ in Example 4.3.
38 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
CE1:2M ðA1;BÞ ¼ 0:1437; CE1:2
M ðA2;BÞ ¼ 0:0547; CE1:2M ðA3;BÞ ¼ 0:2000;
CE1:6M ðA1;BÞ ¼ 0:1242; CE1:6
M ðA2;BÞ ¼ 0:0321; CE1:6M ðA3;BÞ ¼ 0:1907;
CE2MðA1;BÞ ¼ 0:1100; CE2
MðA2;BÞ ¼ 0:0200; CE2MðA3;BÞ ¼ 0:1800;
CE2NðA1;BÞ ¼ 0:1234; CE2
NðA2;BÞ ¼ 0:0282; CE2NðA3;BÞ ¼ 0:1926;
CE16N ðA1;BÞ ¼ 0:1407; CE16
N ðA2;BÞ ¼ 0:0476; CE16N ðA3;BÞ ¼ 0:2023;
CE1000N ðA1;BÞ ¼ 0:1556; CE1000
N ðA2;BÞ ¼ 0:0710; CE1000N ðA3;BÞ ¼ 0:2035:
Obviously, the sample B belongs to the pattern A2 by using theminimum degree of cross entropy. These results are in agreementwith the ones obtained in [42,51–54]. For Example 4.3, more re-sults about the proposed cross entropy measures are shown in Figs.10 and 11, it is noted that the value of CEp
M decreases as p(1 < p 6 2)increases, and the value of CEq
N increases as q(q > 0) increases.
5. Aggregation operators for intuitionistic fuzzy information
For a, b 2 V and k P 0, Xu [20], Xu and Yager [21] gave someoperational laws by which we can get other IFVs:
(1) aþ b ¼ ðla þ lb � lalb; mambÞ;
(2) ab ¼ ðlalb; ma þ mb � mambÞ;(3) ka ¼ ð1� ð1� laÞ
k; mk
aÞ;(4) ak ¼ ðlk
a;1� ð1� maÞkÞ.
The laws (1)–(4) can be described in detail by the Figs. 12–15. InFig. 12, let x = la and y = ma, the colour denotes the value ofla + lb � lalb. In Fig. 13, let x = la and y = ma, the colour denotesthe value of lalb. In Fig. 14, let x = la and y = k, the colour denotesthe value of 1 � (1 � la)k. In Fig. 15, let x = la and y = k, the colourdenotes the value of lk
a. Moreover, we find that all the values ofx + y � xy, xy, 1 � (1 � x)y and xy are non-decreasing as x and yincrease.
By comparing Figs. 12 and 13, we can find that the values ofx + y � xy seem to be no smaller than those of xy for the same point(x,y). By comparing Figs. 14 and 15, it’s obvious that the values ofxy are no smaller than those of 1 � (1 � x)y for the same point (x,y).To give more evidence, we give Figs. 16 and 17, where Fig. 16 de-scribes the values of x + y � xy � xy, and Fig. 17 describes the val-ues of xy � (1 � (1 � x)y), it is noted that all the values are non-negative.
For a, b 2 V and k P 0, based on the above analysis, it is evi-dent that
Fig. 13. Values of xy.
Fig. 14. Values of 1 � (1 � x)y.
Fig. 15. Values of xy.
Fig. 16. Values of x + y � xy � xy.
Fig. 12. Values of x + y � xy.
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 39
la þ lb � lalb P lalb; ma þ mb � mamb P mamb;
lka P 1� ð1� laÞ
k; mk
a P 1� ð1� maÞk ð36Þ
thus
aþ b ¼ ðla þ lb � lalb; mambÞPab ¼ ðlalb; ma þ mb � mambÞ ð37Þ
and
ka ¼ 1� ð1� laÞk; mk
a
� �6 ak ¼ lk
a;1� ð1� maÞk� �
ð38Þ
In other words, the values of a + b are not always smaller than thoseof ab, and the values of ka are not always bigger than those of ak.
Based on the above operational laws, many aggregation opera-tors have been developed [20–22]. It is noted that all the aboveoperational laws use different operations on membership andnon-membership information. However, in most cases, we are
Fig. 17. Values of xy � (1 � (1 � x)y). Fig. 19. Values of xy/(xy + (1 � x)(1 � y)).
40 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
natural and the membership degree and the non-membershipdegree of IFVs should be treated fairly. So it is necessary to developsome neutral operations about IFVs. For such cases, we will intro-duce some new operational laws for IFVs:
Definition 5.1. Let a, b 2 V and k P 0, then
(1) k� a ¼ lka
lkað1�laÞ
k ;mka
mkaþð1�maÞk
� �;
(2) a� b ¼ lalb
lalbþð1�laÞð1�lbÞ;
mamb
mambþð1�maÞð1�mbÞ
� �.
Compared with the existing operational laws, the ones definedin Definition 5.1 treat the membership information and the non-membership information equally. More details about the opera-tional laws can be found in Figs. 18 and 19. In Fig. 18, let x = laand y = k, the colour denotes the value of lk
alk
aþð1�laÞk and it is noted
that the value of lka
lkaþð1�laÞ
k is non-decreasing as la increases. InFig. 19, let x = la and y = lb, the colour denotes the value of
lalb
lalbþð1�laÞð1�lbÞ, and it is noted that the value of lalb
lalbþð1�laÞð1�lbÞis
non-decreasing as la or lb increases.
Fig. 18. Values of xy/(xy + (1 � x)y).
To compare the defined new operations with the ones definedby Xu [20], Xu and Yager [21], we give Figs. 20–23. The color ofeach point (x,y) in Figs. 20–23 denotes the value of
xyxyþð1�xÞð1�yÞ � xy, xþ y� xy� xy
xyþð1�xÞð1�yÞ ; xy � xy
xyþð1�xÞy and xy
xyþð1�xÞy�ð1� ð1� xÞyÞ, respectively.
For a, b 2 V and k P 0, based on the above analysis, it is evi-dent that
la þ lb � lalb Plalb
lalb þ ð1� laÞð1� lbÞP lalb;
ma þ mb � mamb Pmamb
mamb þ ð1� maÞð1� mbÞP mamb ð39Þ
lka P
lka
lka þ ð1� laÞ
k P 1� ð1� laÞk;
mka P
mamb
mamb þ ð1� maÞð1� mbÞP 1� ð1� maÞk ð40Þ
thus
Fig. 20. Values of xy/(xy + (1 � x)(1 � y)) � xy.
Fig. 21. Values of x + y � xy � xy/(xy + (1 � x)(1 � y)).
Fig. 22. Values of xy � xy=ðxy þ ð1� xÞyÞ.
Fig. 23. Values of xy/(xy + (1 � x)y) � (1 � (1 � x)y).
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 41
la þ lb � lalb � mamb
Plalb
lalb þ ð1� laÞð1� lbÞ� mamb
mamb þ ð1� maÞð1� mbÞP lalb � ðma þ mb � mambÞ ð41Þ
lka � ð1� ð1� maÞkÞ
Plk
a
lka þ ð1� laÞ
k �mamb
mamb þ ð1� maÞð1� mbÞ
P 1� ð1� laÞk � lk
a ð42Þ
and
aþ b P a� b P ab; ak P k� a P ka ð43Þ
which indicate that the defined operations are neutral.
Theorem 5.1. Let a and b be two IFVs, k P 0, then k � a and a � bare also IFVs.
The Proof of Theorem 5.1 is provided in Appendix A.
Based on the operational laws (1) and (2) in Definition 4.1, wedevelop some intuitionistic fuzzy aggregation operators as follows:
Definition 5.2. For a collection of IFVs a = (a1,a2 , . . . ,an),w =(w1,w2, . . . ,wn)T is the weight vector of ai (i = 1,2, . . . ,n) withwi P 0, i = 1,2, . . . ,n, and
Pni¼1wi ¼ 1, if SIFWA: Vn ? V, and
SIFWAwða1;a2; � � � ;anÞ ¼ ðw1 � a1Þ � ðw2 � a2Þ � � � � � ðwn � anÞð44Þ
then we call the function SIFWA a symmetric intuitionistic fuzzyweighted averaging (SIFWA) operator. Especially, if w = (1/n,1/n, . . . ,1/n)T, then the SIFWA operator can be written as:
SIFAða1;a2; � � � ;anÞ ¼1n� a1
� �� 1
n� a2
� �� � � � � 1
n� an
� �ð45Þ
which is called a symmetric intuitionistic fuzzy averaging (SIFA)operator. By the defined operational laws, it is easy to prove that:
SIFWAwða1;a2; . . . ;anÞ
¼
Qni¼1
lwiai
Qni¼1
lwiaiþQni¼1ð1� lai
Þwi
;
Qni¼1
mwiai
Qni¼1
mwiaiþQni¼1ð1� mai
Þwi
0BB@
1CCA ð46Þ
Example 5.1 [55]. Consider that a customer wants to buy a car,which will be chosen from five types. In the process of choosingone of the cars, six factors are considered—G1: the consumptionpetrol, G2: the maximum mileage, G3: the price, G4: the degree ofcomfort, G5: the design of each type of car, and G6: the safety factor.Suppose that the characteristic information of the alternatives A1
(i = 1–3) are represented by the IFVs aij (i = 1,2,3; j = 1,2, . . . ,6)listed in Table 3 (the intuitionistic fuzzy decision matrix). Let w =(0.15,0.25,0.14,0.16,0.20,0.10)T be the weight vector ofGi(i = 1,2, . . . ,6), we use the IFWA [20], GIFWA [22] (here we letk = 2), IFWG [21] and SIFWA (Eq. (46)) operators to collect theoverall values of each type of car, the results are listed in Table 4.
By analyzing Table 4, we can find that the four aggregationoperators can get the same ranking of alternatives, but the mostvalues obtained by the SIFWA operator are smaller than those ob-tained by the IFWA [20] and GIFWA [22] operators, and are biggerthan those obtained by the IFWG [21] operator.
Table 3Intuitionistic fuzzy decision matrix R.
C1 C2 C3 C4 C5 C6
G1 (0.4,0.5) (0.7,0.1) (0.4,0.3) (0.5,0.4) (0.2,0.6) (0.5,0.4)G2 (0.5,0.3) (0.5,0.2) (0.6,0.2) (0.7,0.1) (0.3,0.6) (0.4,0.3)G3 (0.6,0.4) (0.5,0.1) (0.5,0.3) (0.7,0.2) (0.4,0.3) (0.7,0.1)G4 (0.3,0.4) (0.7,0.1) (0.5,0.1) (0.6,0.2) (0.4,0.5) (0.4,0.2)
42 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
Definition 5.3. For a collection of IFVs a = (a1,a2 , . . . ,an), andx = (x1,x2 , . . . ,xn)T is the associated weight vector with xi
P 0,i = 1,2, . . . ,n, andPn
i¼1xi ¼ 1. If SIFOWA: Vn ? V, and
SIFOWAxða1;a2; . . . ;anÞ ¼ ðx1 � arð1ÞÞ � ðx2 � arð2ÞÞ � � � �� ðxn � arðnÞÞ ð47Þ
then we call the function SIFOWA a symmetric intuitionistic fuzzyordered weighted averaging (SIFOWA) operator, where ar(i) is theith largest of ak(k = 1,2,. . .,n). Moreover, we have
SIFOWAxða1;a2; . . . ;anÞ
¼
Qni¼1
lwiarðiÞ
Qni¼1
lwiarðiÞ þ
Qni¼1ð1� larðiÞ
Þwi
;
Qni¼1
mwiarðiÞ
Qni¼1
mwiarðiÞ þ
Qni¼1ð1� marðiÞ Þ
wi
0BB@
1CCA ð48Þ
The SIFOWA operator is developed based on the idea of the or-dered weighted averaging (OWA) operator [18]. The fundamentalaspect of the OWA operator is its reordering step. Several methodshave been developed to obtain the OWA weights. Yager [18] sug-gested a way to compute the OWA weights using linguistic quan-tifiers. O’Hagan [56] developed a procedure to generate the OWAweights that have a predefined degree of orness and maximizethe entropy of the OWA weights. Yager [57] introduced some fam-ilies of the OWA weights. Filev and Yager [58] developed two pro-cedures, based on the exponential smoothing, to obtain the OWAweights. Yager and Filev [59] suggested an algorithm to obtainthe OWA weights from a collection of samples with the relevantaggregated data. Xu and Da [60] established a linear objective-pro-
Table 4Comparison of rankings with different aggregation operators.
z1 z2
IFWA (0.4903,0.3047) (0.5135,0Scores (rankings) 0.1857(4) 0.2668(3)
GIFWA2 (0.5104,0.2893) (0.5244,0Scores (rankings) 0.2212(4) 0.2859(3)
IFWG (0.4244,0.3912) (0.4779,0Scores (rankings) 0.0332(4) 0.1643(3)
SIFWA (0.4544,0.3335) (0.4956,0Scores (rankings) 0.1208(4) 0.2311(3)
Table 5Comparison of rankings with different aggregation operators.
z1 z2
IFOWA (0.4627,0.3561) (0.5109, 0Scores (rankings) 0.1066(4) 0.2660(3)
GIFOWA2 (0.4726,0.3471) (0.5178,0Scores (rankings) 0.1255(4) 0.2772(3)
IFOWG (0.4336,0.3964) (0.4891,0Scores (rankings) 0.0372(4) 0.2093(3)
SIFOWA (0.4466,0.3711) (0.5000,0Scores (rankings) 0.0756(4) 0.2462(3)
gramming model to obtain the OWA weights under partial weightinformation. Especially, based on the normal distribution (Gauss-ian distribution), Xu [61] developed a method to obtain the OWAweights, whose prominent characteristic is that it can relieve theinfluence of unfair arguments on the decision result by assigninglow weights to those ‘‘false’’ or ‘‘biased’’ ones.
In Example 5.1, assume that the associated weight vector is
x ¼ ð0:0865;0:1716;0:2419;0:2419;0:1716;0:0865ÞT
If we use the IFOWA [20] , GIFOWA [22] (here we let k = 2) , IFOWG[21] and SIFOWA (Eq. (48)) operators to aggregate the attribute val-ues, then the results are shown in Table 5.
By analyzing Table 5, we can find that the four aggregationoperators can get the same ranking of the alternatives, but themost values obtained by the SIFOWA operator are smaller thanthose obtained by the IFWA [20] and GIFOWA [22] operators,and are bigger than those obtained by the IFOWG [21] operator.
From Definitions 5.1 and 5.2, we know that the SIFWA operatoronly weights the argument itself, but ignores the importance of theordered position of the argument, while the SIFOWA operator onlyweights the ordered position of the argument, but ignores theimportance of the argument. To solve this drawback, we shouldintroduce a symmetric intuitionistic fuzzy hybrid aggregation (SIF-HA) operator, which weights both the given argument and its or-dered position.
Definition 5.4. For a collection of IFVs a = (a1,a2
, . . . ,an),x = (x1,x2, . . . ,xn)T is the associated weight vectorwith xi P 0, i = 1,2, . . . ,n, and
Pni¼1xi ¼ 1. If SIFHA: Vn ? V, and
SIFHAw;xða1;a2; . . . ;anÞ ¼ ðx1 � _arð1ÞÞ � ðx2 � _arð2ÞÞ � � � �� ðxn � _arðnÞÞ ð49Þ
then we call the function SIFHA a symmetric intuitionistic fuzzy hy-brid aggregation (SIFHA) operator, where _arðiÞ is the ith largest ofnwk � ak (k = 1,2, . . . ,n) and w = (w1,w2, . . . ,wn)T is the weight vectorof a = (a1,a2, . . . ,an). Especially, if w = (1/n,1/n, . . . ,1/n)T, then the
z3 z4
.2468) (0.5715,0.2050) (0.5283,0.2034)0.3666(1) 0.3249(2)
.2385) (0.5769,0.2007) (0.5411,0.1964)0.3761(1) 0.3447(2)
.3136) (0.5519,0.2425) (0.4851,0.2697)0.3095(1) 0.2153(2)
.2645) (0.5630, 0.2129) (0.5070,0.2179)0.3500(1) 0.2891(2)
z3 z4
.2449) (0.5609, 0.1998) (0.4968,0.2078)0.3610(1) 0.2890(2)
.2406) (0.5677,0.1958) (0.5060,0.2024)0.3719(1) 0.3036(2)
.2797) (0.5364,0.2370) (0.4694,0.2579)0.2994(1) 0.2114(2)
.2538) (0.5498,0.2076) (0.4826,0.2188)0.3423(1) 0.2638(2)
Table 7Intuitionistic fuzzy decision matrix R2.
C1 C2 C3 C4 C5
G1 (0.5,0.3) (0.6,0.1) (0.7,0.3) (0.7,0.1) (0.8,0.2)G2 (0.7,0.2) (0.6,0.2) (0.4,0.4) (0.6,0.2) (0.7,0.3)G3 (0.5,0.3) (0.7,0.2) (0.6,0.3) (0.4,0.2) (0.6,0.1)G4 (0.5,0.4) (0.8,0.1) (0.4,0.2) (0.7,0.2) (0.7,0.3)G5 (0.7,0.3) (0.5,0.4) (0.6,0.3) (0.6,0.2) (0.5,0.1)
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 43
SIFHA operator becomes the SIFOWA operator. Furthermore, wehave
SIFHAw;x a1;a2; � � � ;anð Þ
¼
Qni¼1
lxi_arðiÞQn
i¼1lxi
_arðiÞþQni¼1
1� l _arðiÞ
� �xi;
Qni¼1
mxi_arðiÞQn
i¼1mxi
_arðiÞ
þYn
i¼1
ð1� m _arðiÞÞxi
0BB@
1CCA ð50Þ
Table 8Intuitionistic fuzzy decision matrix R3.
C1 C2 C3 C4 C5
G1 (0.6,0.3) (0.5,0.2) (0.6,0.4) (0.8,0.1) (0.7,0.3)G2 (0.8,0.2) (0.5,0.3) (0.6,0.4) (0.5,0.2) (0.6,0.3)G3 (0.6,0.1) (0.8,0.2) (0.7,0.3) (0.4,0.2) (0.8,0.1)G4 (0.6,0.3) (0.6,0.1) (0.5,0.4) (0.9,0.1) (0.5,0.2)G5 (0.8,0.1) (0.6,0.2) (0.7,0.3) (0.5,0.2) (0.7,0.1)
Example 5.2. Let a1 = (0.3,0.5), a2 = (0.4,0.3), a3 = (0.5,0.4),a4 = (0.3,0.4) and a5 = (0.6,0.2) be five IFVs, and w = (0.2,0.3,0.15,0.25,0.1)T the weight vector of ai (i = 1,2, . . . ,5) , then
_a1 ¼0:35�0:2
0:35�0:2 þ ð1� 0:3Þ5�0:2 ;0:55�0:2
0:55�0:2 þ ð1� 0:5Þ5�0:2
!
¼ ð0:3000;0:5000Þ
_a2 ¼0:45�0:3
0:45�0:3 þ ð1� 0:4Þ5�0:3 ;0:35�0:3
0:35�0:3 þ ð1� 0:3Þ5�0:3
!
¼ ð0:5352;0:1643Þ
_a3 ¼0:55�0:15
0:55�0:15 þ ð1� 0:5Þ5�0:15 ;0:45�0:15
0:45�0:2 þ ð1� 0:4Þ5�0:15
!
¼ ð0:4054;0:5030Þ
_a4 ¼0:35�0:25
0:35�0:25 þ ð1� 0:3Þ5�0:25 ;0:45�0:25
0:45�0:25 þ ð1� 0:4Þ5�0:25
!
¼ ð0:3597;0:3181Þ
_a5 ¼0:65�0:1
0:65�0:1 þ ð1� 0:6Þ5�0:1 ;0:25�0:1
0:25�0:2 þ ð1� 0:2Þ5�0:1
!
¼ ð0:3675;0:4472Þ
Calculating the scores of _aj (j = 1,2, . . . ,5), we have
sð _a1Þ ¼ �0:2000; sð _a2Þ ¼ 0:3709; sð _a3Þ ¼ �0:0976;sð _a4Þ ¼ 0:0416; sð _a5Þ ¼ �0:0797
Since sð _a2Þ > sð _a4Þ > sð _a5Þ > sð _a3Þ > sð _a1Þ, then
_arð1Þ ¼ ð0:5352;0:1643Þ; _arð2Þ ¼ ð0:3597; 0:3181Þ;_arð3Þ ¼ ð0:3675;0:4472Þ;_arð4Þ ¼ ð0:4054;0:5030Þ; _arð5Þ ¼ ð0:3000;0:5000Þ
Suppose that x = (0.1120,0.2360,0.3040,0.2360,0.1120)T (derivedby the normal distribution based method [61]) is the weight vectorof the SIFHA operator, then, by Eq. (50), it follows that
SIFHAw;xða1;a2;a3;a4;a5Þ ¼ ð0:3845;0:3956Þ
6. Illustrative examples
In this section, we give two examples to illustrate the methodsproposed in Section 2.
Table 6Intuitionistic fuzzy decision matrix R1.
C1 C2 C3 C4 C5
G1 (0.4,0.5) (0.5,0.2) (0.6,0.2) (0.8,0.1) (0.7,0.3)G2 (0.6,0.2) (0.7,0.2) (0.3,0.4) (0.5,0.1) (0.8,0.2)G3 (0.7,0.3) (0.8,0.1) (0.5,0.5) (0.3,0.2) (0.6,0.3)G4 (0.4,0.3) (0.7,0.1) (0.6,0.1) (0.4,0.3) (0.9,0.1)G5 (0.8,0.1) (0.3,0.4) (0.4,0.5) (0.7,0.2) (0.5,0.2)
Example 6.1. We discuss a problem concerned with a manufac-turing company (adapted from Ref. [62]) searching the best globalsupplier for one of its most critical parts used in assemblingprocess. The attributes which are considered here in selection ofsix potential global suppliers Gi (i = 1,2,. . .,5) are: C1: overall cost ofthe product, C2: quality of the product, C3: service performance ofsupplier, C4: supplier’s role, and C5: risk factor. An expert group isformed which consists of four experts Dk (k = 1,2,3,4) (whoseweight vector is k = (0.3,0.2,0.3,0.2)T) from each strategic decisionarea. The experts Dk (k = 1,2,3,4) represent, respectively, thecharacteristics of the potential global suppliers Gi (i = 1,2,. . .,5) bythe IFVs a kð Þ
ij (i, j = 1,2,. . .,5) with respect to the attributesCj (j = 1,2,. . .,5), listed in Tables 6–9 (i.e., intuitionistic fuzzydecision matrices RðkÞ ¼ ðaðkÞij Þ5�5 ðk ¼ 1;2;3;4ÞÞ. We determinethe associated weight vector of the SIFHA operator by using thenormal distribution based method [61] as g = (0.155,0.345,0.345,0.155)T.
Case 1: If the information about the attribute weights is com-pletely unknown, then we use the developed methodto handle the above problem which needs the followingsteps:
Step 1. Use Eq. (11) to calculate the weight vector of attributes.wa is the corresponding weight vector obtained by usingthe pair of entropy/cross entropy-1 (p = 1.5):
Table 9Intuitio
G1
G2
G3
G4
G5
wa ¼ ð0:1940;0:2238;0:1330;0:2117;0:2375ÞT
Step 2. Utilize the SIFHA operator (Eq. (50)) to get the collectiveintuitionistic fuzzy decision matrix R = (aij)5�5 (see Table10).
Step 3. By the SIFWA operator (Eq. (46)), we get
z1 ¼ ð0:6337;0:2249Þ; z2 ¼ ð0:5985;0:2174Þ;z3 ¼ ð0:6086;0:2000Þ;z4 ¼ ð0:6344;0:1993Þ; z5 ¼ ð0:6218;0:1929Þ
Step 4. Caculate the scores of zi(i = 1,2,. . .,5):
nistic fuzzy decision matrix R4.
C1 C2 C3 C4 C5
(0.3,0.4) (0.9,0.1) (0.8,0.1) (0.5,0.5) (0.4,0.6)(0.7,0.1) (0.7,0.3) (0.4,0.2) (0.8,0.2) (0.3,0.1)(0.4,0.1) (0.5,0.2) (0.8,0.1) (0.6,0.2) (0.6,0.3)(0.8,0.2) (0.5,0.1) (0.6,0.4) (0.7,0.2) (0.7,0.2)(0.6,0.1) (0.8,0.2) (0.7,0.2) (0.6,0.3) (0.8,0.1)
Table 10Group intuitionistic fuzzy decision matrix R.
C1 C2 C3 C4 C5
G1 (0.4418,0.3768) (0.5949,0.1531) (0.6568,0.2395) (0.7438,0.1273) (0.6949,0.3051)G2 (0.6824,0.1666) (0.6232,0.2627) (0.4241,0.3440) (0.5553,0.1386) (0.6352,0.2470)G3 (0.5779,0.1868) (0.7438,0.1770) (0.6535,0.2979) (0.4044,0.2000) (0.6429,0.1868)G4 (0.5454,0.3296) (0.6700,0.1000) (0.5188,0.2732) (0.6902,0.2089) (0.6787,0.1869)G5 (0.7405,0.1161) (0.5454,0.2823) (0.6054,0.3156) (0.5793,0.2109) (0.6319,0.1325)
Table 1Compar
wa
Scorwb
Scorwc
Scor
Table 12Intuitionistic fuzzy decision matrix R.
44 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
sðz1Þ ¼ 0:4088; sðz2Þ ¼ 0:3810; sðz3Þ ¼ 0:4086; sðz4Þ¼ 0:4351; sðz5Þ ¼ 0:4289
C1 C2 C3 C4
G1 (0.5,0.4) (0.6,0.3) (0.3,0.6) (0.2,0.7)G2 (0.7,0.3) (0.7,0.2) (0.7,0.2) (0.4,0.5)
Step 5. Rank the alternatives according to the descending order ofs(zi)(i = 1,2, . . . ,5):
G3 (0.6,0.4) (0.5,0.4) (0.5,0.3) (0.6,0.3)G (0.8,0.1) (0.6,0.3) (0.3,0.4) (0.2,0.6)
G4 � G5 � G1 � G3 � G2
4G5 (0.6,0.2) (0.4,0.3) (0.7,0.1) (0.5,0.3)
In Step 1, we can also use the pair of entropy/cross entropy-2(q = 1) to get the weight vector of attributes, that is:
wb ¼ ð0:1931;0:2219;0:1325;0:2133;0:2392ÞT
By repeating the above steps, the corresponding results are listed inTable 11.
Case 2: If the information about the attribute weights is com-pletely unknown. Suppose that the known weight infor-mation is presented as:
H ¼ fw1 P 0:1; 0:2 6 w2 6 0:3; w3 P 0:15; 0:2 6 w4 6 0:5; 0:3
6 w5 6 0:4g
We can use (MOD-1) to derive the weights for attributes. Based onthe pair of entropy/cross entropy-1 (p = 1.5), we can establish thefollowing model:
Max Ew ¼ 1:2758 w1 þ 1:4724 w2 þ 0:8747 w3 þ 1:3924 w4
þ 1:5626 w5
s:t: w 2 H
Solving the above model, we can get the optimal weight vector:
wc ¼ ð0:1;0:2;0:15;0:2;0:35ÞT
By repeating the above steps, the corresponding results are listed inTable 11. Although the rankings are slightly different under differ-ent weight vectors, the optimal alternative is A4.
If there is only one decision maker, then the proposed methodin Section 2 can be used to solve the problem proposed by Wei[10] and Ye [11]. Next, we give an example adapted from Ref.[10] to compare the proposed method with Wei’s method [10]and Ye’s method [11].
Example 6.2. Let us suppose that there is an investment company,which wants to invest a sum of money in the best option (adaptedfrom Ref. [10]). There is a panel with five possible alternatives to
1ison of rankings under different weight vector.
z1 z2
(0.6337,0.2249) (0.5985,0.2174)es (rankings) 0.4088(3) 0.3810(5)
(0.6342,0.2249) (0.5984,0.2173)es (rankings) 0.4097(3) 0.3811(5)
(0.6575,0.2246) (0.5914,0.2280)es (rankings) 0.4329(2) 0.3634(5)
invest the money: G1: a car company, G2: a food company, G3: acomputer company, G4: an arms company, and G5: a TV company.The investment company must take a decision according to thefollowing four attributes: C1: the risk analysis, C2: the growthanalysis, C3: the social-political impact analysis, and C4: theenvironmental impact analysis. The five possible alternatives Gi
(i = 1,2,. . .,5) are to be evaluated using the intuitionistic fuzzyinformation by the decision maker under the above four attributes,as listed in Table 12.
Then, we utilize the developed approach to get the most desir-able alternative(s).
Case 1: If the information about the attribute weights is com-pletely unknown, we utilize the developed approach toget the most desirable alternative(s).
Step 1. Utilize Eq. (11) to get the weight vector of attributes(Here we use the pair of entropy/cross entropy-1(p = 1.3):
z3
(0.0.4(0.0.3(0.0.4
w ¼ ð0:3003;0:1541;0:3122;0:2334ÞT
Step 2. By the SIFWA operator (Eq. (46)), we obtain the overallvalues of alternatives:
z1 ¼ ð0:3715;0:5180Þ; z2 ¼ ð0:6353;0:2889Þ;z3 ¼ ð0:5539;0:3438Þ;z4 ¼ ð0:4727;0:3053Þ; z5 ¼ ð0:5803;0:1930Þ
Step 3. Calculate the scores of the overall intuitionistic fuzzyvalues:
sðz1Þ ¼ �0:1465; sðz2Þ ¼ 0:3464; sðz3Þ ¼ 0:2121; sðz4Þ¼ 0:1674; sðz5Þ ¼ 0:3872
Step 4. Rank all alternatives in accordance with the scores of theoverall intuitionistic fuzzy values:
z4 z5
6086, 0.2000) (0.6344,0.1993) (0.6218,0.1929)086(4) 0.4351(1) 0.4289(2)6081, 0.2000) (0.6346,0.1994) (0.6218,0.1927)908(4) 0.4081(1) 0.4291(2)6149,0.2018) (0.6441,0.1918) (0.6127,0.1935)231(4) 0.4523(1) 0.4192(3)
M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47 45
G5 � G2 � G3 � G4 � G1
thus the most desirable alternative is G5.
In such case, if we use Ye’s method, we can get the weight vec-tor of attributes:
w ¼ ð0:2659;0:2486;0:2370;0:2486ÞT
and get the same ranking of alternatives:
G5 � G2 � G3 � G4 � G1
Case 2: If the information about the attribute weights is partlyknown and the known weight information is given asfollows:
H ¼ f0:15 6 w1 6 0:2; 0:16 6 w2 6 0:18; 0:3 6 w3
6 0:35; 0:3 6 w4 6 0:45g
Step 1. Utilize the (MOD-1) to establish the following program-ming model:
Max Ew ¼ 0:9903w1 þ 0:5082w2 þ 1:0296w3 þ 0:7697w4
s:t: w 2 H
Solving this model, we get the weight vector of attributes:
w ¼ ð0:19;0:16;0:35; 0:3ÞT
Step 2. By Eq. (46), we obtain the overall values of alternatives:
z1 ¼ ð0:3435;0:5457Þ; z2 ¼ ð0:6157; 0:2957Þ;z3 ¼ ð0:5495;0:3334Þ;z4 ¼ ð0:4051;0:3605Þ; z5 ¼ ð0:5766;0:1943Þ
Step 3. Calculate the scores of the overall intuitionistic fuzzyvalues:
sðz1Þ ¼ �0:2022; sðz2Þ ¼ 0:3201; sðz3Þ ¼ 0:2161; sðz4Þ¼ 0:0446; sðz5Þ ¼ 0:3823
Step 4. Rank all alternatives in accordance with the scores of theoverall intuitionistic fuzzy values:
G5 � G2 � G3 � G4 � G1
and thus the most desirable alternative is G5
Based on the above analysis, although the proposed method,Ye’s method and Wei’s method can get the same ranking of alter-natives, Ye’s method only considers the entropy information ofattribute and Wei’s method only considers the divergences be-tween alternatives, moreover, the entropy used in Ye’s method isnot very good which has been discussed in Section 3. Thus, the pro-posed method is more reasonable.
7. Conclusions
In this paper, we have investigated group decision making prob-lems under intuitionistic fuzzy environment. We have proposedthe entropy/cross entropy based method to determine the weightsof attributes. The attribute, which has small entropy and largecross entropy, should be assigned a large weight. To support theweight-determining methods, two new pairs of intuitionistic fuzzyentropy and cross entropy measures have been constructed whichgeneralize the existing ones. Some examples have been used toillustrate the advantages of the proposed entropy and crossentropy measures. Moreover, we have developed a class of neutral
operators to aggregate intuitionistic fuzzy information treating themembership and non-membership information fairly. An examplehas shown that the proposed aggregation operators can get moreneutral results than the existing ones. Finally, we have given anexample to compare the proposed method with Ye’s methodand Wei’ method. It is worth noting that the results of this papercan be extended to the interval-valued intuitionistic fuzzyenvironment.
Acknowledgments
The work was supported in part by the National Science Fundfor Distinguished Young Scholars of China (No. 70625005), theNational Natural Science Foundation of China (No. 71071161),the Program Sponsored for Scientific Innovation Research of Col-lege Graduate in Jiangsu Province (No. CX10B_059Z), and the Sci-entific Research Foundation of Graduate School of SoutheastUniversity.
Appendix A
A.1. Proof of Theorem 4.1
ð1Þ EpMðaÞ ¼ 0() 2
1� 21�p
1� la þ 1� ma
2
� �p�
� ð1� laÞp þ ð1� maÞp
2
�¼ �1
() 1� 21�p ¼ ðð1� laÞp þ ð1� maÞpÞ � 21�pðð1� laÞ þ ð1� maÞÞp
() ð1� laÞp þ ð1� maÞp ¼ 1 andðð1� laÞ þ ð1� maÞÞp ¼ 1
() a ¼ ð1; 0Þ or a ¼ ð0;1Þ
ð2Þ EpMðaÞ ¼ 1() 1� la þ 1� ma
2
� �p
� ð1� laÞp þ ð1� maÞp
2
¼ 0() la ¼ ma:
(3) Let f ðx; yÞ ¼ xþy2
� �p � xpþyp
2
� �; x > y; t ¼ x� y > 0;1 < p 6 2
then
f ðt; yÞ ¼ t þ 2y2
� �p
� ðt þ yÞp þ yp
2
� �;
f 0t ðt; yÞ ¼12
pt2þ y
� �p�1
� pðt þ yÞp�1
!< 0
and thus f is a decreasing function of t.Similarly, we can prove that when x < y, t = y � x, f is a decreasingfunction of t. Let x = 1 � la, y = 1 � ma, and if la P lb P mb P maand la 6 lb 6 mb 6 ma, then we can obtain E(a) 6 E(b).
(4) It is obvious.
A.2. Proof of Theorem 4.2
It is obvious that CEqNða; bÞ ¼ CEq
Nðb;aÞ. Let q > 0,
Dqða;bÞ ¼ð1þ qlaÞ lnð1þ qlaÞ þ ð1þ qlbÞ lnð1þ qlbÞ
2
�1þ qla þ 1þ qlb
2ln
1þ qla þ 1þ qlb
2
þ ð1þ qmaÞ lnð1þ qmaÞ þ ð1þ qmbÞ lnð1þ qmbÞ2
� 1þ qma þ 1þ qmb
2ln
1þ qma þ 1þ qmb
2
46 M. Xia, Z. Xu / Information Fusion 13 (2012) 31–47
þ ð1þ qpaÞ lnð1þ qpaÞ þ ð1þ qpbÞ lnð1þ qpbÞ2
� 1þ qpa þ 1þ qpb
2ln
1þ qpa þ 1þ qpb
2
and f = (1 + qx)ln(1 + qx) and 0 6 x 6 1, then f0= qln(1 + qx) + q P 0
and f 00 ¼ q2
1þqx > 0, thus f is a concave-up function of x, and Dq(a,b)is convex. Therefore, Dq(a,b) increases as ka � bk1 increases, whereka � bk1 = jla � lbj + jma � mbj + jpa � pbj. Then Dq(a,b) attains itsmaximum at a = (0,1,0),b = (1,0,0) (or a = (1,0,0), b = (0,0,1) ora = (0,0,1), b = (0,1,0)), Dq(a,b) attains its minimum when la = lb
and la = lb, which follows that
0 6 Dqða;bÞ 6 ð1þ qÞ lnð1þ qÞ � ð2þ qÞðlnð2þ qÞ � ln 2Þ
and Dq(a,b) = 0 if and only if la = lb, ma = mb, thus
0 6 CEqNða;bÞ ¼
Dqða;bÞð1þ qÞ lnð1þ qÞ � ð2þ qÞðlnð2þ qÞ � ln 2Þ 6 1
If la 6 lb 6 lc and ma P mb P mc, then
jla � lbj þ jma � mbj þ jpa � pbj 6 jla � lcj þ jma � mcj þ jpa � pcj;jlb � lcj þ jmb � mcj þ jpb � pcj 6 jla � lcj þ jma � mcj þ jpa � pcj
therefore
CEqNða;bÞ 6 CEq
Nða; cÞ; CEqNðb; cÞ 6 CEq
Nða; cÞ
A.3. Proof of Theorem 4.3
It’s easy to prove EqNðaÞ ¼ Eq
Nð�aÞ.Let H ¼ ð1þqð1�laÞÞ lnð1þqð1�laÞÞþð1þqð1�maÞÞ lnð1þqð1�maÞÞ
2 �
1þ qð1� laÞ þ 1þ qð1� maÞ2
ln1þ qð1� laÞ þ 1þ qð1� maÞ
2;
q > 0
Then EqNðaÞ ¼ � 2
ð1þqÞ lnð1þqÞ�ð2þqÞðlnð2þqÞ�ln 2ÞH þ 1; q > 0
Let f = (1 + q(1 � x))ln(1 + q(1 � x)) and 0 6 x 6 1, thenf0= � qln(1 + q(1 � x)) � q 6 0 and f 00 ¼ q2
1þqð1�xÞ P 0, thus f is a con-cave-up function of x, and H is convex. Therefore H increases asjla � maj increases, and Eq
NðaÞ decreases as la � ma increases,
EqNðaÞ attains its minimum value 0 at a = (0,1) (or a = (1,0)) and at-
tains its maximum value 1 at la = ma. If la 6 lb 6 mb 6 ma orla P lb P mb P ma, then jla � majP jlb � mbj, we can getEq
NðaÞ 6 EqNðbÞ which completes the proof.
A.4. Proof of Theorem 5.1
Since 0 6 lka
lkaþð1�laÞ
k ;mka
mkaþð1�maÞk
6 1 and
mka
mka þ ð1� maÞk
¼ 11þ ð1=ma � 1Þk
61
1þ ð1=ð1� laÞ � 1Þk
¼ ð1� laÞk
ð1� laÞk þ lk
a
then we have
lka
lka þ ð1� laÞ
k þmk
a
mka þ ð1� maÞk
6lk
a
lka þ ð1� laÞ
k þð1� laÞ
k
lka þ ð1� laÞ
k
¼ 1
thus, k � a is an IFV. Similarly,
0 6lalb
lalb þ ð1� laÞð1� lbÞ;
mamb
mamb þ ð1� maÞð1� mbÞ
6 1mamb
mamb þ ð1� maÞð1� mbÞ6
11þ ð1=ma � 1Þð1=mb � 1Þ
61
1þ ð1=ð1� laÞ � 1Þð1=ð1� laÞ � 1Þ
¼ð1� laÞð1� lbÞ
lalb þ ð1� laÞð1� lbÞ
Thus
lalb
lalb þ ð1� laÞð1� lbÞþ mamb
mamb þ ð1� maÞð1� mbÞ
6
lalb
lalb þ ð1� laÞð1� lbÞþ
ð1� laÞð1� lbÞlalb þ ð1� laÞð1� lbÞ
¼ 1
which implies that a � b is an IFV.
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