Neighborhood reconstruction and cancellation of graphs

Abstract

We connect two seemingly unrelated problems in graph theory. Any graph G has an associated neighborhood multiset N(G)= \N(x) x∈ V(G)\ whose elements are precisely the open vertex-neighborhoods of G. In general there exist non-isomorphic graphs G and H for which N(G)=N(H). The neighborhood reconstruction problem asks the conditions under which G is uniquely reconstructible from its neighborhood multiset, that is, the conditions under which N(G)=N(H) implies G H. Such a graph is said to be neighborhood-reconstructible. The cancellation problem for the direct product of graphs seeks the conditions under which G× K H× K implies G H. Lovasz proved that this is indeed the case if K is not bipartite. A second instance of the cancellation problem asks for conditions on G that assure G× K H× K implies G H for any bipartite graph K with E(K)≠ . A graph G for which this is true is called a cancellation graph. We prove that the neighborhood-reconstructible graphs are precisely the cancellation graphs. We also present some new results on cancellation graphs, which have corresponding implications for neighborhood reconstruction.