TY - JOUR
T1 - On Cyclic Triple System and Factorization
AU - Alqadri, Mowafaq AU - Karim, Sharmila AU - Ibrahim, Haslinda
JO - Journal of Engineering and Applied Sciences
VL - 14
IS - 21
SP - 7928
EP - 7933
PY - 2019
DA - 2001/08/19
SN - 1816-949x
DO - jeasci.2019.7928.7933
UR - https://makhillpublications.co/view-article.php?doi=jeasci.2019.7928.7933
KW - near-k-factor
KW -Triple system
KW -factorization
KW -demonstrate
KW -starter triples
KW -complete multigraph
AB - A near-k-factor of a graph G is a spanning subgraph in which exactly one isolated vertex and all other
vertices of order k. In this study, we employ the near-four-factor concept and (m1, m2, …, mr)-cycle system to present a new method for constructing a cyclic 12-fold triple system. Firstly, we would like to propose a new
type of cyclic triple system called cyclic triple near factorization, denoted by CTNF(υ). Then, we prove the
existence of CTNF(υ) along with an algorithm for starter triples of CTNF(υ) for υ = 12n+2 when, n is even.
Finally, we use the construction of CTNF(υ) to demonstrate the existence of [a, b] factorization of 12 Kυ for a
a = 8 and b = 4 (υ-1).
ER -