Relation Equations in the Set of Finite Natural Numbers and Its Maximal Solution
Abstract
Definition of relation equations Quv◦Xvw=Suw in the set of finite natural numbers is given. Rapid method of solving the maximal solution of relation equations Quv◦Xvw=Suw in the set of finite natural numbers is provided.
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[1] Hua, L. G. (1963). Advanced mathematics. Beijing, China: Science Press.
[2] Gibas, C., & Jambeck, P. (2001). Developing bioinformatics computer skills. Cambridge, England: O Reilly&Associates, 1nc.
[3] Liu, J. (2003). Digital image processing and advanced applications. Beijing, China: Science Press.
[4] Hua, L. G. (1957). Number theoretic guidance. Beijing, China: Science Press.
[5 Cheng, Y. Y. (1984). Fuzzy mathematics (pp.30-36). Wuhan, China: Huazhong Institute of Technology Press.
[6] Sanchez, E. (1976). Resolution of composite fuzzy relation equations. Information and Control, 30, 38-48.
DOI: http://dx.doi.org/10.3968/5795
DOI (PDF): http://dx.doi.org/10.3968/pdf_11
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