2019 Help me understand this report
On the Steiner antipodal number of graphs
Abstract: The Steiner n-antipodal graph of a graph G on p vertices, denoted by SA n (G), has the same vertex set as G and any n(2 n p) vertices are mutually adjacent in SA n (G) if and only if they are n-antipodal in G. When G is disconnected, any n vertices are mutually adjacent in SA n (G) if not all of them are in the same component. SA n (G) coincides with the antipodal graph A(G) when n = 2. The least positive integer n such that SA n (G) ⇠ = H, for a pair of graphs G and H on p vertices, is called the Steiner …
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