2026-04-17T13:51:02Zhttps://recercat.cat/oai/request

oai:recercat.cat:2445/1222362025-12-05T05:56:10Zcom_2072_1057col_2072_478917col_2072_478919

00925njm 22002777a 4500 dc Adillón, Román author Jorba, Lambert author 2018-05-09T12:06:31Z 2018-05-09T12:06:31Z 2017-07 2018-05-09T12:06:31Z The aim of this work is to construct quantified trapezoidal fuzzy numbers as an extension of trapezoidal fuzzy numbers, by using modal intervals and accepting the possibility that the α-cuts of a trapezoidal fuzzy number may also be improper intervals. In addition, this paper addresses the inclusion relationship which is deduced from the inclusion of modal intervals and is related to the classical set-inclusion relationship between trapezoidal fuzzy numbers. Moreover, in this paper we also study the extensions of real continuous functions over the set of quantified trapezoidal fuzzy numbers. Using the semantic interpretation of the calculations over modal intervals will enable us to interpret the meaning of the calculus accurately over quantified trapezoidal fuzzy numbers. With quantified trapezoidal fuzzy numbers, we will be able to overcome some operational limitations that are usually faced when working with trapezoidal fuzzy numbers from a classical point of view. In order to show the applicability of quantified trapezoidal fuzzy numbers, we propose fuzzy equations which have no solution in the set of proper fuzzy numbers yet do have solutions that are improper fuzzy numbers. We also propose two applications of quantified trapezoidal fuzzy numbers, one of them about financial calculations and the other one in an optical problem. Sistemes borrosos Conjunts borrosos Anàlisi d'intervals (Matemàtica) Matemàtica Fuzzy systems Fuzzy sets Interval analysis (Mathematics) Mathematics Quantified trapezoidal fuzzy numbers