The set of ratios of derangements to permutations in digraphs is dense in [0, 1/2]
Abstract
A permutation in a digraph G=(V, E) is a bijection f:V → V such that for all v ∈ V we either have that f fixes v or (v, f(v)) ∈ E. A derangement in G is a permutation that does not fix any vertex. In [1] it is proved that in any digraph, the ratio of derangements to permutations is at most 1/2. Answering a question posed in [1], we show that the set of possible ratios of derangements to permutations in digraphs is dense in the interval [0, 1/2].
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