Sayed, M., 2018. Biometric gait recognition using machine learning algorithms. J. Comput. Sci., 14: 1064-1073.
Sayed, M., 2016. Binary linear codes and symmetric generation of finite simple groups. Int. J. Algebra, 10: 299-311. Direct Link |
Sayed, M., 2015. Palm vein authentication based on the coset decomposition method. J. Inform. Secur., 6: 197-205. CrossRef | Direct Link |
Sayed, M., 2015. Grobner bases method for biometric traits identification and encryption. J. Inform. Secur., 6: 241-249. Direct Link |
Sayed, M., 2015. Coset decomposition method for storing and decoding fingerprint data. J. Adv. Comput. Sci. Technol., 4: 6-11. Direct Link |
Sayed, M., 2015. An approach to implement interactive teaching in blended learning environments. J. Adv. Comput. Sci. Technol., 4: 37-42. Direct Link |
Sayed, M. and F. Baker, 2015. E-Learning optimization using supervised artificial neural-network. J. Software Eng. Applic., 8: 26-34. CrossRef | Direct Link |
Sayed, M. and F. Jradi, 2014. Biometrics: Effectiveness and applications within the blended learning environment. Comput. Eng. Intell. Syst., 5: 1-8. Direct Link |
Sayed, M. and F. Baker, 2014. Blended learning barriers: An investigation, exposition and solutions. J. Educ. Pract., 5: 81-85. Direct Link |
Sayed, M., 2013. Blended learning environments: The effectiveness in developing concepts and thinking skills. J. Educ. Pract., 4: 12-17. Direct Link |
Sayed, M., 2011. Coset decomposition method for decoding linear codes. Int. J. Algebra, 5: 1395-1404. Direct Link |
Sayed, M., 2009. Coset enumeration of symmetrically generated groups using Grobner bases. Int. J. Algebra, 3: 693-705. Direct Link |
Sayed, M., 2008. Combinatorial method in the coset enumeration of symmetrically generated groups. Int. J. Comput. Math., 85: 993-1001. CrossRef | Direct Link |
Sayed, M., 2007. Groups symmetrically generated by elements of order 3 with permutation action. Southeast Asian Bull. Math., 31: 749-756. Direct Link |
Sayed, M., 2007. Combinatorial method in the coset enumeration of symmetrically generated groups. II. Monomial modular representations. Int. J. Algebra, 1: 505-518. Direct Link |
Sayed, M., 2005. Transitive permutation representation for symmetrically generated groups. Southeast Asian Bull. Math., 29: 157-167. Direct Link |
Sayed, M., 2005. Double-coset enumeration algorithm for symmetrically generated groups. Int. J. Math. Math. Sci., 2005: 699-715.
Sayed, M., 2005. Coset enumeration of groups generated by symmetric sets of Involutions. Int. J. Math. Math. Sci., 2005: 3739-3750. CrossRef | Direct Link |
Sayed, M., 2004. Involutory symmetric generators and linear groups. J. Inst. Math. Comput. Sci. (Math. Ser.), 17: 81-89.
Sayed, M., 2003. Some homomorphic images of the progenitor 2*4:S4. J. Inst. Math. Comput. Sci. (Math. Ser.), 16: 29-35.
Sayed, M., 2003. Nested symmetric representation of elements of the Suzuki chain groups. Int. J. Math. Math. Sci., 2003: 3931-3948. CrossRef | Direct Link |
Sayed, M., 2001. Coset enumeration algorithm for symmetrically presented groups. Alexandria Eng. J., 40: 319-323.