Johnson graphs are panconnected
Abstract
For any given n,m ∈ N with m < n , the Johnson graph J(n,m) is defined as the graph whose vertex set is V=\v v⊂eq [n]=\1,...,n\, |v|=m\, where two vertices v,w are adjacent if and only if |v w|=m-1. A graph G of order n > 2 is panconnected if for every two vertices u and v, there is a u-v path of length l for every integer l with d(u,v) ≤ l ≤ n-1. In this paper, we prove that the Johnson graph J(n,m) is a panconnected graph.
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