A Prey Predator Model with Fuzzy Initial Values

Yıl 2012, Cilt: 41 Sayı: 3, 387 - 395, 01.03.2012

Ömer Akın Ömer Oruç

Anahtar Kelimeler

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Kaynakça

• Bede, B. and Gal, S. G. Generalizations of the differentiability of fuzzy number valued func- tions with applications to fuzzy differential equation, Fuzzy Sets and Systems 151, 581–599, 2005.
• Bede, B., Rudas, I. J. and Bencsik, A. L. First order linear fuzzy differential equations under generalized differentiability, Inform. Sci. 177, 1648–1662, 2007.
• Chalco-Cano, Y. and Rom´an-Flores, H. On the new solution of fuzzy differential equations, Chaos Solitons Fractals 38, 112–119, 2006.
• Gal, S. G. Approximation theory in fuzzy setting, in: G. A. Anastassiou (Ed.), Handbook of Analytic-Computational Methods in Applied Mathematics (Chapman & Hall/CRC Press, Boca Raton, FL, 2000), 617–666.
• Kaleva, O. Fuzzy differential equations, Fuzzy Sets and Systems 24, 301–317, 1987.
• Khastan, A., Bahrami, F. and Ivaz, K. New results on multiple solutions for nth-order fuzzy differential equations under generalized differentiability, boundary value problems 2009, Ar- ticle ID 395714, 2009.
• Khastan, A. Fuzzy Differential Equations, SciTopics, 2010: Retrieved February 6, 2012, from http://www.scitopics.com/Fuzzy Differential Equations.html.
• Puri, M. and Ralescu, D. Differential and fuzzy functions, J. Math. Anal. Appl. 91, 552–558, 1983.
• Wu, C. and Gong, Z. On Henstock integral of fuzzy-number-valued functions I, Fuzzy Sets and Systems 120, 523–532, 2001.