Functionality of Random Graphs
Abstract
The functionality of a graph G is the minimum number k such that in every induced subgraph of G there exists a vertex whose neighbourhood is uniquely determined by the neighborhoods of at most k other vertices in the subgraph. The functionality parameter was introduced in the context of adjacency labeling schemes, and it generalises a number of classical and recent graph parameters including degeneracy, twin-width, and symmetric difference. We establish the functionality of a random graph G(n,p) up to a constant factor for every value of p.
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