论文信息 - On the composition of fuzzy power relations

On the composition of fuzzy power relations

This paper deals with the "powering" of binary fuzzy relations (i.e. lifting a fuzzy relation R defined on a set X to the relation R + defined on the set F ( X ) of all fuzzy subsets of X). We prove that for any complete residuated lattice L , the composition of the powers of two L -relations is always a subset of the power of their composition. Answering to a question posed by Georgescu, we prove that the converse is not always true. We prove that the composition of the powers of two L -relations is equal to the power of their composition if and only if L is a Heyting algebra.

Ivica Bosnjak | R. Madarász | Ivica Bosnjak | R. Madarász | Ivica Bošnjak

[1] J. Goguen. L-fuzzy sets , 1967 .

[2] Martina Danková,et al. Relational compositions in Fuzzy Class Theory , 2009, Fuzzy Sets Syst..

[3] Andrei Popescu,et al. Non-dual fuzzy connections , 2004, Arch. Math. Log..

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

[5] Ivica Bosnjak,et al. Power algebras and generalized quotient algebras , 2001 .

[6] George Georgescu,et al. Fuzzy power structures , 2008, Arch. Math. Log..

[7] V. Novák,et al. Mathematical Principles of Fuzzy Logic , 1999 .

[8] Dexue Zhang,et al. Good fuzzy preorders on fuzzy power structures , 2010, Arch. Math. Log..

[9] Petr Hájek,et al. Metamathematics of Fuzzy Logic , 1998, Trends in Logic.

[10] Cosimo Guido,et al. Transporting many-valued sets along many-valued relations , 2008, Fuzzy Sets Syst..

[11] R. Belohlávek. Fuzzy Relational Systems: Foundations and Principles , 2002 .