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Abstract

A complex fuzzy set is a set whose membership values are vectors in the unit circle in the complex plane. To enhance and extend the applicability of complex fuzzy sets, this paper investigates and develops different types of distance measures for complex fuzzy sets. Several distance measures of complex fuzzy sets are introduced. After that, the application of these distances to continuity problems of complex fuzzy operations is given.

Keywords

Distances continuity complex fuzzy sets complex fuzzy operations.

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References

Alkouri

A.U.M.

and Salleh

A.R.

, Linguistic variables, hedges and several distances on complex fuzzy sets, J Intell Fuzzy Syst 26 (2014), 2527–2535.

Buckley

J.J.

, Fuzzy complex numbers, Fuzzy Sets Syst 33 (1989), 333–345.

Chen

, Aghakhani

, Man

and Dick

, ANCFIS: A neuro-fuzzy architecture employing complex fuzzy sets, IEEE Trans Fuzzy Syst 19 (2011), 305–322.

Dick

, Towards complex fuzzy logic, IEEE Trans Fuzzy Syst 13 (2005), 405–414.

Dick

, Yager

and Yazdanbahksh

, On pythagorean and complex fuzzy set operations, IEEE Trans Fuzzy Syst 24 (2016), 1009–1021.

Greenfield

, Chiclana

and Dick

, Interval-valued complex fuzzy logic, Fuzzy Systems (FUZZ-IEEE), 2016 IEEE International Conference on IEEE 2016 pp. 2014–2019.

Greenfield

, Chiclana

and Dick

, Join and meet operations for interval-valued complex fuzzy logic, Fuzzy Information Processing Society (NAFIPS), 2016 Annual Conference of the North American IEEE 2016 pp. 1–5.

, Bi

and Dai

, The orthogonality between complex fuzzy sets and its application to signal detection, Symmetry 9 (2017), 175.

, Complex neuro-fuzzy ARIMA forecasting. A new approach using complex fuzzy sets, IEEE Trans Fuzzy Syst 21 (2013), 567–584.

10.

, Chiang

T.-W.

and Yeh

L.-C.

, A novel self-organizing complex neuro-fuzzy approach to the problem of time series forecasting, Neurocomputing 99 (2013), 467–476.

11.

, Wu

and Chan

F.-T.

, Self-learning complex neurofuzzy system with complex fuzzy sets and its application to adaptive image noise canceling, Neurocomputing 94 (2012), 121–139.

12.

, Zhang

and Lu

, A method for multiple periodic factor prediction problems using complex fuzzy sets, IEEE Trans Fuzzy Syst 20 (2012), 32–45.

13.

Moses

, Degani

, Teodorescu

H.-N.

, Friedman

, Kandel

FUZZ-IEEE (1999), 1340–1345 Linguistic coordinate transformations for complex fuzzy sets,.

14.

Ramot

, Milo

, Friedman

and Kandel

, Complex fuzzy sets, IEEE Trans Fuzzy Syst 10 (2002), 171–186.

15.

Ramot

, Friedman

, Langholz

and Kandel

, Complex fuzzy logic, IEEE Trans Fuzzy Syst 11 (2003), 450–461.

16.

Searcoid

M.Ó.

, Metric Spaces. Springer-Verlag 2007–London.

17.

Tamir

D.E.

, Jin

and Kandel

, A new interpretation of complex membership grade, Int J Intell Syst 26 (2011), 285–312.

18.

Tamir

D.E.

and Kandel

, Axiomatic theory of complex fuzzy logic and complex fuzzy classes, Int J Comput Commun Control 4 (2011), 562–576.

19.

Yager

R.R.

and Abbasov

A.M.

, Pythagorean membership grades, complex numbers, and decision making, Int J Intell Syst 28 (2013), 436–452.

20.

Yazdanbakhsh

, Krahn

and Dick

, Predicting solar power output using complex fuzzy logic, Edmonton, Presented at the Joint IFSA World Congress and NAFIPS Annual Meeting, AB 2013.

21.

Yazdanbakhsh

and Dick

, A systematic review of complex fuzzy sets and logic. Fuzzy Sets Syst (2017). 10.1016/j-fss.2017.01.010 .

22.

Zhang

, Dillon

T.S.

, Cai

K.-Y.

, Ma

and Lu

, Operation properties and delta-equalities of complex fuzzy sets, Int J Approx Reason 50 (2009), 1227–1249.