"Cramer?s Rule for Systems of Fuzzy Relation Equations"@en . . . . . . "Proceedings of 2011 IFSA World Vongress - AFSS INternational Conference" . "192182" . "The aim of this contribution is to apply the theory of bideterminants and to show that solvability of a system of fuzzy relation equations can be investigated with the help of them. We will investigate a subclass of similarity matrices over a semiring reduct of a residuated lattice and show that they are results of elementary transformations of the unit matrix. We will investigate applicability of Cramer's rule to a system of fuzzy relation equations with a similarity matrix of coefficients." . . "Perfiljeva, Irina" . . "978-602-99359-0-5" . . "2011-06-21+02:00"^^ . "Vectorial semilinear space; Bideterminant; Linear dependence"@en . "Surabya" . "Cramer?s Rule for Systems of Fuzzy Relation Equations" . "RIV/61988987:17610/11:A12012L2" . "Cramer?s Rule for Systems of Fuzzy Relation Equations"@en . . "17610" . "1"^^ . "Cramer?s Rule for Systems of Fuzzy Relation Equations" . "1"^^ . "RIV/61988987:17610/11:A12012L2!RIV12-AV0-17610___" . . "P(IAA108270902)" . "The aim of this contribution is to apply the theory of bideterminants and to show that solvability of a system of fuzzy relation equations can be investigated with the help of them. We will investigate a subclass of similarity matrices over a semiring reduct of a residuated lattice and show that they are results of elementary transformations of the unit matrix. We will investigate applicability of Cramer's rule to a system of fuzzy relation equations with a similarity matrix of coefficients."@en . . . "Neuveden" . "[9BEA9673ACBD]" . . . . . . "6"^^ .