Dr. Saed Mallak

Associate Professor
Palestine Technical University Kadoorie, Palestine

Highest Degree
Ph.D. in Mathematics from Palestine Technical University Kadoorie, Palestine

My URL
https://livedna.org/970.19894

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Area of Interest:

Mathematics
Applied Mathematics
Geometric Theory
Dynamical System
Fuzzy Logic

Selected Publications

  1. Mallak, S.F., D. Bedo and O. Hamed, 2014. A new approach for ranking k+1-trapezoidal fuzzy numbers. Adv. Fuzzy Math., 9: 63-76.

  2. Mallak, S.F. and D. Bedo, 2014. Ranking particular fuzzy numbers using area, mode, spreads and weights. Adv. Fuzzy Math., 9: 7-19.

  3. Mallak, S.F. and D. Bedo, 2013. Particular fuzzy numbers and a fuzzy comparison method between them. Int. J. Fuzzy Math. Syst., 3: 113-123.
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  4. Mallak, S.F. and D. Bedo, 2013. A fuzzy comparison method for particular fuzzy numbers. J. Mahani Math. Res. Center, 2: 1-14.

  5. Mallak, S.F., 2012. On the limit of 2x2 regular fuzzy Markov chains: Uncertain probabilities. Int. J. Sci. Adv. Technol., 2: 19-26.

  6. Mallak, S.F., M. Mara'Beh and A. Zaiqan, 2011. Further particular classes of ergodic finite fuzzy Markov chains. Adv. Fuzzy Math., 6: 269-281.

  7. Mallak, S.F., M. Mara'Beh and A. Zaiqan, 2011. A particular class of ergodic finite fuzzy markov chains. Adv. Fuzzy Math., 6: 253-268.

  8. Mallak, S.F., 2011. Particular fuzzy numbers and their application to regular 2x2 fuzzy Markov chains: Uncertain probabilities. J. Dynamical Syst. Geomet. Theor., 9: 137-150.

  9. Mallak, S.F., 2006. Towards: Palestinian school mathematics developed in content and method within principles and standards liable to development and modification. J. Al Quds Open Univ. Res. Stud., 7: 415-433.

  10. Attili, B. and S.F. Mallak, 2006. Existence of limit cycles in a predator-prey system with a functional response of the form arctan(ax). Commun. Math. Anal., 1: 27-33.
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  11. Mallak, S.F., 2005. Countable extreme Gibbs states in a one-dimensional model with a unique ground state and uniqueness conditions in 1-dimensional models. Global J. Pure Applied Math., 1: 112-119.

  12. Mallak, S.F., 2005. A class of 1-Dim. Models with unique ground states that admits phase transitions. J. Dynamical Syst. Geomet. Theor., 3: 109-114.

  13. Mallak, S.F., 2004. Limit theorems for non stationary discrete time Markov chains. J. Al Quds Open Univ., 3: 7-31.

  14. Kerimov, A. and S. Mallak, 1999. Density' Gibbs states and uniqueness conditions in one-dimensional models. J. Phys. A Math. Gen., 32: 3711-3716.
Member since September, 2017