On saturation numbers of complete multipartite graphs and even cycles
Abstract
Given positive integer n and graph F, the saturation number sat(n, F) is the minimum number of edges in an edge-maximal F-free graph on n vertices. In this paper, we determine asymptotic behavior of sat(n, F) when F is either a complete multipartite graph or a cycle graph whose length is even and large enough. This extends a result by Bohman, Fonoberova, and Pikhurko from 2010 as well as partially resolves a conjecture of F\"uredi and Kim from 2013.
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