Infinite induced-saturated graphs
Abstract
A graph G is H-induced-saturated if G is H-free but deleting any edge or adding any edge creates an induced copy of H. There are non-trivial graphs H, such as P4, for which no finite H-induced-saturated graph G exists. We show that for every finite graph H that is not a clique or an independent set, there always exists a countable H-induced-saturated graph. In fact, we show that a far stronger property can be achieved: there is a countably infinite H-free graph G such that any graph G' G obtained by making a locally finite set of changes to G contains a copy of H.
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