Professor Ho Chee Kit

Professor Ho Chee Kit

  • Dean and Professor
SDGs Focus
Good Health and Well Being
Decent Work and Economic Growth

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

  1. 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.
  2. 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.
  3. 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.
  4. 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.
  5. Chia, G. L., & Ho, C. K. (2009). Chromatic equivalence classes of complete tripartite graphs. Discrete Math, 309, 134–143.
  6. 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.
  7. Ho, C. K. (2010). Join of graphs and chromatic equivalence classes. Prosiding Seminar Kebangsaan Aplikasi Sains & Matematik, 405–411.
  8. 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.
  9. 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.