Cauchy-like functional equation based on a class of uninorms

Commuting is an important property in any two-step information merging procedure where the results should not depend on the order in which the single steps are performed. In the case of bisymmetric aggregation operators with the neutral elements, Saminger, Mesiar and Dubois, already reduced characterization of commuting n-ary operators to resolving the unary distributive functional equations, but only some sufficient conditions of unary functions distributive over two particular classes of uninorms are given out. Along this way of thinking, in this paper, we will investigate and fully characterize the following functional equation f(U(x, y)) = U(f(x), f(y)), where f : [0,1] → [0,1] is an unknown function, a uninorm U ε Umin has a continuous underlying t-norm TU and a continuous underlying t-conorm SU- Our investigation shows the key point is a transformation from this functional equation to the several known ones. Moreover, this equation has non-monotone solutions different completely with those obtained ones.

[1]  Pietro Benvenuti,et al.  General theory of the fuzzy integral , 1996 .

[2]  Michal Baczynski,et al.  Distributive Equations of Implications Based on Continuous Triangular Norms (I) , 2012, IEEE Transactions on Fuzzy Systems.

[3]  J. Aczél,et al.  Equations of Generalized Bisymmetry and of Consistent Aggregation: Weakly Surjective Solutions Which May Be Discontinuous at Places , 1997 .

[4]  Radko Mesiar,et al.  Domination of Aggregation Operators and Preservation of Transitivity , 2002, Int. J. Uncertain. Fuzziness Knowl. Based Syst..

[5]  R. Mesiar,et al.  Aggregation Functions: Aggregation on ordinal scales , 2009 .

[6]  Chunqiao Tan,et al.  Generalized intuitionistic fuzzy geometric aggregation operator and its application to multi-criteria group decision making , 2011, Soft Comput..

[7]  Gleb Beliakov,et al.  Aggregation Functions: A Guide for Practitioners , 2007, Studies in Fuzziness and Soft Computing.

[8]  Michal Baczynski,et al.  Distributivity equations of implications based on continuous triangular conorms (II) , 2014, Fuzzy Sets Syst..

[9]  Feng Qin,et al.  Cauchy-Like Functional Equation Based on Continuous T-Conorms and Representable Uninorms , 2015, IEEE Transactions on Fuzzy Systems.

[10]  D. Dubois,et al.  Aggregation of decomposable measures with application to utility theory , 1996 .

[11]  Marc Roubens,et al.  Fuzzy Preference Modelling and Multicriteria Decision Support , 1994, Theory and Decision Library.

[12]  S. Gottwald A Treatise on Many-Valued Logics , 2001 .

[13]  James E. Andrews,et al.  Combinatorial rule explosion eliminated by a fuzzy rule configuration , 1998, IEEE Trans. Fuzzy Syst..

[14]  Mai Gehrke,et al.  Varieties generated by T-norms , 2004, Soft Comput..

[15]  Gloria Bordogna,et al.  A flexible multi criteria information filtering model , 2010, Soft Comput..

[16]  Yong Su,et al.  Left and right semi-uninorms on a complete lattice , 2013, Kybernetika.

[17]  Susana Montes,et al.  On complete fuzzy preorders and their characterizations , 2011, Soft Comput..

[18]  Feng Qin,et al.  On the distributive equation of implication based on a continuous t-norm and a continuous Archimedean t-conorm , 2011, 2011 4th International Conference on Biomedical Engineering and Informatics (BMEI).

[19]  Ronald R. Yager,et al.  Uninorm aggregation operators , 1996, Fuzzy Sets Syst..

[20]  J. Aczél,et al.  Lectures on Functional Equations and Their Applications , 1968 .

[21]  Radko Mesiar,et al.  Binary survival aggregation functions , 2012, Fuzzy Sets Syst..

[22]  Carlos Javier Mantas,et al.  A generic fuzzy aggregation operator: rules extraction from and insertion into artificial neural networks , 2007, Soft Comput..

[23]  Endre Pap,et al.  Information aggregation in intelligent systems: An application oriented approach , 2013, Knowl. Based Syst..

[24]  Michal Baczynski,et al.  On the Distributivity of Fuzzy Implications Over Nilpotent or Strict Triangular Conorms , 2009, IEEE Transactions on Fuzzy Systems.

[25]  Bernard De Baets,et al.  Transitivity Bounds in Additive Fuzzy Preference Structures , 2007, IEEE Transactions on Fuzzy Systems.

[26]  Ronald R. Yager,et al.  Structure of Uninorms , 1997, Int. J. Uncertain. Fuzziness Knowl. Based Syst..

[27]  Radko Mesiar,et al.  Aggregation Operators and Commuting , 2007, IEEE Transactions on Fuzzy Systems.

[28]  Li Yang,et al.  Distributive equations of implications based on nilpotent triangular norms , 2010, Int. J. Approx. Reason..

[29]  Radko Mesiar,et al.  Triangular Norms , 2000, Trends in Logic.

[30]  Joan Torrens,et al.  Residual implications and co-implications from idempotent uninorms , 2004, Kybernetika.