Minimum saturated graphs without 4-cycles and 5-cycles
Abstract
Given a family of graphs F, a graph G is said to be F-saturated if G does not contain a copy of F as a subgraph for any F∈F, but the addition of any edge e E(G) creates at least one copy of some F∈F within G. The minimum size of an F-saturated graph on n vertices is called the saturation number, denoted by sat(n, F). Let Cr be the cycle of length r. In this paper, we study on sat(n, F) when F is a family of cycles. In particular, we determine that sat(n, \C4,C5\)=5n4-32 for any positive integer n.
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