Pn-induced-saturated graphs exist for all n ≥ 6

Abstract

Let Pn be a path graph on n vertices. We say that a graph G is Pn-induced-saturated if G contains no induced copy of Pn, but deleting any edge of G as well as adding to G any edge of Gc creates such a copy. Martin and Smith (2012) showed that there is no P4-induced-saturated graph. On the other hand, there trivially exist Pn-induced-saturated graphs for n=2,3. Axenovich and Csik\'os (2019) ask for which integers n ≥ 5 do there exist Pn-induced-saturated graphs. R\"aty (2019) constructed such a graph for n=6, and Cho, Choi and Park (2019) later constructed such graphs for all n=3k for k ≥ 2. We show by a different construction that Pn-induced-saturated graphs exist for all n ≥ 6, leaving only the case n=5 open.