On induced saturation for paths

Abstract

For a graph H, a graph G is H-induced-saturated if G does not contain an induced copy of H, but either removing an edge from G or adding a non-edge to G creates an induced copy of H. Depending on the graph H, an H-induced-saturated graph does not necessarily exist. In fact, Martin and Smith (2012) showed that P4-induced-saturated graphs do not exist, where Pk denotes a path on k vertices. Axenovich and Csik\'os (2019) asked the existence of Pk-induced-saturated graphs for k 5; it is easy to construct such graphs when k∈\2, 3\. Recently, R\"aty constructed a graph that is P6-induced-saturated. In this paper, we show that there exists a Pk-induced-saturated graph for infinitely many values of k. To be precise, we find a P3n-induced-saturated graph for every positive integer n. As a consequence, for each positive integer n, we construct infinitely many P3n-induced-saturated graphs. We also show that the Kneser graph K(n,2) is P6-induced-saturated for every n 5.