construct Haar graph
The HaarGraph(n) function creates the nth Haar graph.
The nth Haar graph is a bipartite graph on m = 2*ilog(i)+2 vertices in which the vertices u[i] and v[j] are adjacent if the kth digit in the binary expansion of n is nonzero, where k = irem(j-i,m).
W ≔ HaarGraph⁡7
W≔Graph 1: an undirected graph with 6 vertices and 9 edge(s)
The GraphTheory[SpecialGraphs][HaarGraph] command was introduced in Maple 2020.
For more information on Maple 2020 changes, see Updates in Maple 2020.
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