Permutations and the divisor graph of [1,n]

Abstract

Let S div(n) denote the set of permutations π of n such that for each 1≤ j ≤ n either j π(j) or π(j) j. These permutations can also be viewed as vertex-disjoint directed cycle covers of the divisor graph D[1,n] on vertices v1, …, vn with an edge between vi and vj if i j or j i. We improve on recent results of Pomerance by showing cd = n ∞ (\# S div(n))1/n exists and that 2.069<cd<2.694. We also obtain similar results for the set S lcm(n) of permutations where lcm(j,π(j))≤ n for all j. The results rely on a graph theoretic result bounding the number of vertex-disjoint directed cycle covers, which may be of independent interest.

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