A note about operations like $T_W$ (the weakest $t$-norm) based addition on fuzzy intervals

Hong, Dug Hun

About DML-CZ | FAQ | Conditions of Use | Math Archives | Contact Us

Previous | Up | Next

Article

A note about operations like $T_W$ (the weakest $t$-norm) based addition on fuzzy intervals. (English). Kybernetika, vol. 45 (2009), issue 3, pp. 541-547

MSC: 03E72, 62A10, 62A86, 62F15, 93E12 | MR 2543139 | Zbl 1165.93340

Full entry |

PDF (0.8 MB) Feedback

Keywords:
fuzzy arithmetics; fuzzy intervals; triangular norms

Summary:
We investigate a relation about subadditivity of functions. Based on subadditivity of functions, we consider some conditions for continuous $t$-norms to act as the weakest $t$-norm $T_W$-based addition. This work extends some results of Marková-Stupňanová [15], Mesiar [18].

Similar articles:

References:

[1] D. Dubois and H. Prade: Additions of interactive fuzzy numbers. IEEE Trans. Automat. Control 26 (1981), 926–936. MR 0635852

[2] R. Fullér and T. Keresztfalvi: $t$-norm-based addition of fuzzy intervals. Fuzzy Sets and Systems 51 (1992), 155–159. MR 1188307

[3] D. H. Hong and S. Y. Hwang: The convergence of $T$-product of fuzzy numbers. Fuzzy Sets and Systems 85 (1997), 373–378. MR 1428313

[4] D. H. Hong: A note on $t$-norm-based addition of fuzzy intervals. Fuzzy Sets and Systems 75 (1995), 73–76. MR 1351592 | Zbl 0947.26024

[5] D. H. Hong and C. Hwang: A $T$-sum bound of $LR$-fuzzy numbers. Fuzzy Sets and Systems 91 (1997), 239–252. MR 1480049

[6] D. H. Hong and H. Kim: A note to the sum of fuzzy variables. Fuzzy Sets and Systems 93 (1998), 121–124. MR 1601517

[7] D. H. Hong and S. Y. Hwang: On the compositional rule of inference under triangular norms. Fuzzy Sets and Systems 66 (1994), 25–38. MR 1294689

[8] D. H. Hong: Shape preserving multiplications of fuzzy intervals. Fuzzy Sets and Systems 123 (2001), 93–96. MR 1848797

[9] D. H. Hong: Some results on the addition of fuzzy intervals. Fuzzy Sets and Systems 122 (2001), 349–352. MR 1854823 | Zbl 1010.03524

[10] D. H. Hong: On shape-preserving additions of fuzzy intervals. J. Math. Anal. Appl. 267 (2002), 369–376. MR 1886835 | Zbl 0993.03070

[11] T. Keresztfalvi and M. Kovács: $g, p$-fuzzification of arithmetic operations. Tatra Mountains Math. Publ. 1 (1992), 65–71. MR 1230464

[12] A. Kolesárová: Triangular norm-based addition preserving linearity of $t$-sums of fuzzy intervals. Mathware and Soft Computing 5 (1998), 97–98. MR 1632755

[13] A. Kolesárová: Triangular norm-based addition of linear fuzzy numbers. Tatra Mountains Math. Publ. 6 (1995), 75–82. MR 1363985

[14] A. Marková: $T$-sum of $L$-$R$-fuzzy numbers. Fuzzy Sets and Systems 85 (1996), 379–384. MR 1428314

[15] A. Marková–Stupňanová: A note to the addition of fuzzy numbers based on a continuous Archimedean $T$-norm. Fuzzy Sets and Systems 91 (1997), 253–258.

[16] R. Mesiar: A note on the $T$-sum of $LR$ fuzzy numbers. Fuzzy Sets and Systems 79 (1996), 259–261. MR 1388398

[17] R. Mesiar: Shape preserving additions of fuzzy intervals. Fuzzy Sets and Systems 86 (1997), 73–78. MR 1438439 | Zbl 0921.04002

[18] R. Mesiar: Triangular-norm-based addition of fuzzy intervals. Fuzzy Sets and Systems 91 (1997), 231–237. MR 1480048 | Zbl 0919.04011

[19] B. Schweizer and A. Star: Associative functions and abstract semigroups. Publ. Math. Debrecen 10 (1963), 69–81. MR 0170967

[20] L. A. Zadeh: The concept of a linguistic variable and its applications to approximate reasoning, Parts, I, II, III. Inform. Sci. 8 (1975), 199–251, 301–357; 9 (1975) 43–80.

Browse
- Collections
- Titles
- Authors
- MSC

About DML-CZ

Partner of

Article

Search

Browse