Recognizing connectedness from vertex-deleted subgraphs (original) (raw)

Let G be a graph of order n. The vertex-deleted subgraph G −v, obtained from G by deleting the vertex v and all edges incident to v, is called a card of G. Let H be another graph of order n, disjoint from G. Then the number of common cards of G and H is the maximum number of disjoint pairs (v, w), where v and w are vertices of G and H, respectively, such that G −v ∼ = H −w. We prove that if G is connected and H is disconnected, Journal of Graph Theory ᭧ 2010 Wiley Periodicals, Inc. then the number of common cards of G and H is at most n / 2 +1. Thus, we can recognize the connectedness of a graph from any n / 2 +2 of its cards. Moreover, we completely characterize those pairs of graphs that attain the upper bound and show that, with the exception of six pairs of graphs of order at most 7, any pair of graphs that attains the maximum is in one of four infinite families.