Creation and Growth of Components in a Random Hypergraph Process
Abstract
Denote by an -component a connected b-uniform hypergraph with k edges and k(b-1) - vertices. We prove that the expected number of creations of -component during a random hypergraph process tends to 1 as and b tend to ∞ with the total number of vertices n such that = o([3]nb). Under the same conditions, we also show that the expected number of vertices that ever belong to an -component is approximately 121/3 (b-1)1/3 1/3 n2/3. As an immediate consequence, it follows that with high probability the largest -component during the process is of size O((b-1)1/3 1/3 n2/3). Our results give insight about the size of giant components inside the phase transition of random hypergraphs.
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