A Simple Explanation for the Reconstruction of Graphs

Abstract

The graph reconstruction conjecture states that all graphs on at least three vertices are determined up to isomorphism by their deck. In this paper, a general framework for this problem is proposed to simply explain the reconstruction of graphs. Here, we do not prove or reject the reconstruction conjecture. But, we explain why a graph is reconstructible. For instance, the reconstruction of small graphs which have been shown by computer, is explained in this framework. We show that any non-regular graph has a proper induced subgraph which is unique due to either its structure or the way of its connection to the rest of the graph. Here, the former subgraph is defined an anchor and the latter a connectional anchor, if it is distinguishable in the deck. We show that if a graph has an orbit with at least three vertices whose removal leaves an anchor, or it has two vertices whose removal leaves an anchor with the mentioned condition in the paper, then it is reconstructible. This simple statement can easily explain the reconstruction of a graph from its deck.