Methods of critical value reduction for type-2 fuzzy variables and their applications
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摘要
A type-2 fuzzy variable is a map from a fuzzy possibility space to the real number space; it is an appropriate tool for describing type-2 fuzziness. This paper first presents three kinds of critical values (CVs) for a regular fuzzy variable (RFV), and proposes three novel methods of reduction for a type-2 fuzzy variable. Secondly, this paper applies the reduction methods to data envelopment analysis (DEA) models with type-2 fuzzy inputs and outputs, and develops a new class of generalized credibility DEA models. According to the properties of generalized credibility, when the inputs and outputs are mutually independent type-2 triangular fuzzy variables, we can turn the proposed fuzzy DEA model into its equivalent parametric programming problem, in which the parameters can be used to characterize the degree of uncertainty about type-2 fuzziness. For any given parameters, the parametric programming model becomes a linear programming one that can be solved using standard optimization solvers. Finally, one numerical example is provided to illustrate the modeling idea and the efficiency of the proposed DEA model.
论文关键词:Fuzzy possibility theory,Type-2 fuzzy variable,Critical value,Reduction methods,Data envelopment analysis,Parametric programming
论文评审过程:Received 25 April 2009, Revised 9 August 2009, Available online 30 August 2010.
论文官网地址:https://doi.org/10.1016/j.cam.2010.08.031