Professor Ho Chee Kit
- Dean and Professor
SDGs Focus
Biography
Ho Chee Kit is a Professor of Mathematics and Dean of the School of Mathematical Sciences. Professor Ho led and pioneered the development of a successful Actuarial Science programme at Sunway University and has more than 30 years of experience in the education field, with related industry exposure in actuarial science, training & education, sales and marketing. His current research focuses on graph polynomials, tiling problems, and number sequences.
Academic & Professional Qualifications
- PhD in Mathematics, University of Malaya, Malaysia (2004)
- MSc in Mathematics, University of Malaya, Malaysia (1998)
- BSc (Hons) Mathematics, University of Malaya, Malaysia (1990)
Research Interests
- Combinatorics
- Graph theory
Notable Publications
- Cheah, C. L., Ho, C. K., & Tan, P. L. (2014). Experimental investigation of Reed-Solomon error correction technique for wireless sensor network. International Journal of Information and Electronic Engineering, 4(2), 133–136.
- Chia, G. L., & Ho, C. K. (2001). On the chromatic uniqueness of edge-gluing of complete bipartite graphs and cycles. Ars Combinatoria, 60, 193–199.
- Chia, G. L., & Ho, C. K. (2003). On the chromatic uniqueness of edge-gluing of complete tripartite graphs and cycles. Bull. Malaysian Math Sc Soc (2), 26, 87–92.
- Chia, G. L., & Ho, C. K. (2009). A result on chromatic uniqueness of edge-gluing of graphs. Journal Combin. Math. And Combin. Comp., 70, 117–126.
- Chia, G. L., & Ho, C. K. (2009). Chromatic equivalence classes of complete tripartite graphs. Discrete Math, 309, 134–143.
- Chia, G. L., & Ho, C. K. (2014). Chromatic equivalence classes of some families of complete tripartite graphs. Bull. Malaysian Math Sc Soc (2), 37(3), 641–646.
- Ho, C. K. (2010). Join of graphs and chromatic equivalence classes. Prosiding Seminar Kebangsaan Aplikasi Sains & Matematik, 405–411.
- Ho, C. K., & Chong, C. Y. (2014). Odd and even sums of generalized Fibonacci numbers by matrix methods. Am. Inst. Phys. Conf. Ser., 1602, 1026–1032.
- Sia, J. Y., Ho, C. K., Ibrahim, H., & Ahmad, N. (2016). Algebraic properties of generalized Fibonacci sequence via matrix methods. Journal of Engineering and Applied Sciences, 11(11), 2396–2401.