Large Components and Trees of Random Mappings
Abstract
Let Tn be the set of all mappings T:[n][n], where [n]=\1,2,…,n\. The corresponding graph GT of T, called a functional digraph, is a union of disjoint connected components. Each component is a directed cycle of rooted labeled trees. We assume that each T∈Tn is chosen uniformly at random from the set Tn. The components and trees of GT are distinguished by their size. In this paper, we compute the limiting conditional probability (n∞) that a vertex from the largest component of the random graph GT, chosen uniformly at random from [n], belongs to its s-th largest tree, where s 1 is a fixed integer. This limit can be also viewed as an approximation of the probability that the s-th largest tree of GT is a subgraph of its largest component, which is a solution of a problem suggested by Mutafchiev and Finch (2024).
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