Characterizing 2-Distance Graphs and Solving the Equations T2(X)=kP2 or Km Kn
Abstract
Let X be a finite, simple graph with vertex set V(X). The 2-distance graph T2(X) of X is the graph with the same vertex set as X and two vertices are adjacent if and only if their distance in X is exactly 2. A graph G is a 2-distance graph if there exists a graph X such that T2(X)=G. In this paper, we give three characterizations of 2-distance graphs, and find all graphs X such that T2(X)=kP2 or Km Kn, where k 2 is an integer, P2 is the path of order 2, and Km is the complete graph of order m 1.
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