Partite saturation number of cycles
Abstract
A graph H is said to be F-saturated relative to G, if H does not contain any copy of F, but the addition of any edge e in E(G) E(H) would create a copy of F. The minimum size of an F-saturated graph relative to G is denoted by sat(G,F). Let Kkn be the complete k-partite graph containing n vertices in each part and C be the cycle of length . In this paper we give an asymptotically tight bound of sat(Kkn,C) for all ≥ 4, k ≥ 2 except (,k)=(4,4). Moreover, we determined the exact value of sat(Kkn,C) for k>=4 and 5 ≥ >k ≥ 3 and (,k)=(6,2).
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