An OWA operator of dimension ${\displaystyle \ n}$  is a mapping ${\displaystyle F:\mathbb {R} ^{n}\rightarrow \mathbb {R} }$  that has an associated collection of weights ${\displaystyle \ W=[w_{1},\ldots ,w_{n}]}$  lying in the unit interval and summing to one and with

${\displaystyle F(a_{1},\ldots ,a_{n})=\sum _{j=1}^{n}w_{j}b_{j}}$ 

where ${\displaystyle b_{j}}$  is the j^th largest of the ${\displaystyle a_{i}}$ .

By choosing different W one can implement different aggregation operators. The OWA operator is a non-linear operator as a result of the process of determining the b_j.

${\displaystyle \ F(a_{1},\ldots ,a_{n})=\max(a_{1},\ldots ,a_{n})}$  if ${\displaystyle \ w_{1}=1}$  and ${\displaystyle \ w_{j}=0}$  for ${\displaystyle j\neq 1}$ 

${\displaystyle \ F(a_{1},\ldots ,a_{n})=\min(a_{1},\ldots ,a_{n})}$  if ${\displaystyle \ w_{n}=1}$  and ${\displaystyle \ w_{j}=0}$  for ${\displaystyle j\neq n}$ 

${\displaystyle \ F(a_{1},\ldots ,a_{n})=\mathrm {average} (a_{1},\ldots ,a_{n})}$  if ${\displaystyle \ w_{j}={\frac {1}{n}}}$  for all ${\displaystyle j\in [1,n]}$ 

The OWA operator is a mean operator. It is bounded, monotonic, symmetric, and idempotent, as defined below.

Two features have been used to characterize the OWA operators. The first is the attitudinal character, also called orness.^[1] This is defined as

${\displaystyle A-C(W)={\frac {1}{n-1}}\sum _{j=1}^{n}(n-j)w_{j}.}$ 

It is known that ${\displaystyle A-C(W)\in [0,1]}$ .

In addition A − C(max) = 1, A − C(ave) = A − C(med) = 0.5 and A − C(min) = 0. Thus the A − C goes from 1 to 0 as we go from Max to Min aggregation. The attitudinal character characterizes the similarity of aggregation to OR operation(OR is defined as the Max).

The second feature is the dispersion. This defined as

${\displaystyle H(W)=-\sum _{j=1}^{n}w_{j}\ln(w_{j}).}$ 

An alternative definition is ${\displaystyle E(W)=\sum _{j=1}^{n}w_{j}^{2}.}$  The dispersion characterizes how uniformly the arguments are being used.

The above Yager's OWA operators are used to aggregate the crisp values. Can we aggregate fuzzy sets in the OWA mechanism? The Type-1 OWA operators have been proposed for this purpose.^{[3] [4]} So the type-1 OWA operators provides us with a new technique for directly aggregating uncertain information with uncertain weights via OWA mechanism in soft decision making and data mining, where these uncertain objects are modelled by fuzzy sets.

The type-1 OWA operator is defined according to the alpha-cuts of fuzzy sets as follows:

Given the n linguistic weights ${\displaystyle \left\{{W^{i}}\right\}_{i=1}^{n}}$  in the form of fuzzy sets defined on the domain of discourse ${\displaystyle U=[0,\;\;1]}$ , then for each ${\displaystyle \alpha \in [0,\;1]}$ , an ${\displaystyle \alpha }$ -level type-1 OWA operator with ${\displaystyle \alpha }$ -level sets ${\displaystyle \left\{{W_{\alpha }^{i}}\right\}_{i=1}^{n}}$  to aggregate the ${\displaystyle \alpha }$ -cuts of fuzzy sets ${\displaystyle \left\{{A^{i}}\right\}_{i=1}^{n}}$  is given as

${\displaystyle \Phi _{\alpha }\left({A_{\alpha }^{1},\ldots ,A_{\alpha }^{n}}\right)=\left\{{{\frac {\sum \limits _{i=1}^{n}{w_{i}a_{\sigma (i)}}}{\sum \limits _{i=1}^{n}{w_{i}}}}\left|{w_{i}\in W_{\alpha }^{i},\;a_{i}}\right.\in A_{\alpha }^{i},\;i=1,\ldots ,n}\right\}}$ 

where ${\displaystyle W_{\alpha }^{i}=\{w|\mu _{W_{i}}(w)\geq \alpha \},A_{\alpha }^{i}=\{x|\mu _{A_{i}}(x)\geq \alpha \}}$ , and ${\displaystyle \sigma :\{\;1,\ldots ,n\;\}\to \{\;1,\ldots ,n\;\}}$  is a permutation function such that ${\displaystyle a_{\sigma (i)}\geq a_{\sigma (i+1)},\;\forall \;i=1,\ldots ,n-1}$ , i.e., ${\displaystyle a_{\sigma (i)}}$  is the ${\displaystyle i}$ th largest element in the set ${\displaystyle \left\{{a_{1},\ldots ,a_{n}}\right\}}$ .

The computation of the type-1 OWA output is implemented by computing the left end-points and right end-points of the intervals ${\displaystyle \Phi _{\alpha }\left({A_{\alpha }^{1},\ldots ,A_{\alpha }^{n}}\right)}$ : ${\displaystyle \Phi _{\alpha }\left({A_{\alpha }^{1},\ldots ,A_{\alpha }^{n}}\right)_{-}}$  and ${\displaystyle \Phi _{\alpha }\left({A_{\alpha }^{1},\ldots ,A_{\alpha }^{n}}\right)_{+},}$  where ${\displaystyle A_{\alpha }^{i}=[A_{\alpha -}^{i},A_{\alpha +}^{i}],W_{\alpha }^{i}=[W_{\alpha -}^{i},W_{\alpha +}^{i}]}$ . Then membership function of resulting aggregation fuzzy set is:

${\displaystyle \mu _{G}(x)=\mathop {\vee } _{\alpha :x\in \Phi _{\alpha }\left({A_{\alpha }^{1},\cdots ,A_{\alpha }^{n}}\right)_{\alpha }}\alpha }$ 

For the left end-points, we need to solve the following programming problem:

${\displaystyle \Phi _{\alpha }\left({A_{\alpha }^{1},\cdots ,A_{\alpha }^{n}}\right)_{-}=\min \limits _{\begin{array}{l}W_{\alpha -}^{i}\leq w_{i}\leq W_{\alpha +}^{i}A_{\alpha -}^{i}\leq a_{i}\leq A_{\alpha +}^{i}\end{array}}\sum \limits _{i=1}^{n}{w_{i}a_{\sigma (i)}/\sum \limits _{i=1}^{n}{w_{i}}}}$ 

while for the right end-points, we need to solve the following programming problem:

${\displaystyle \Phi _{\alpha }\left({A_{\alpha }^{1},\cdots ,A_{\alpha }^{n}}\right)_{+}=\max \limits _{\begin{array}{l}W_{\alpha -}^{i}\leq w_{i}\leq W_{\alpha +}^{i}A_{\alpha -}^{i}\leq a_{i}\leq A_{\alpha +}^{i}\end{array}}\sum \limits _{i=1}^{n}{w_{i}a_{\sigma (i)}/\sum \limits _{i=1}^{n}{w_{i}}}}$ 

This paper^[5] has presented a fast method to solve two programming problem so that the type-1 OWA aggregation operation can be performed efficiently.

Amanatidis, Barrot, Lang, Markakis and Ries^[6] present voting rules for multi-issue voting, based on OWA and the Hamming distance. Barrot, Lang and Yokoo^[7] study the manipulability of these rules.

• Liu, X., "The solution equivalence of minimax disparity and minimum variance problems for OWA operators," International Journal of Approximate Reasoning 45, 68–81, 2007.
• Torra, V. and Narukawa, Y., Modeling Decisions: Information Fusion and Aggregation Operators, Springer: Berlin, 2007.
• Majlender, P., "OWA operators with maximal Rényi entropy," Fuzzy Sets and Systems 155, 340–360, 2005.
• Szekely, G. J. and Buczolich, Z., " When is a weighted average of ordered sample elements a maximum likelihood estimator of the location parameter?" Advances in Applied Mathematics 10, 1989, 439–456.