A note on the random triadic process

Abstract

For a fixed integer r≥slant 3, let Hr(n,p) be a random r-uniform hypergraph on the vertex set [n], where each r-set is an edge randomly and independently with probability p. The random r-generalized triadic process starts with a complete bipartite graph Kr-2,n-r+2 on the same vertex set, chooses two distinct vertices x and y uniformly at random and iteratively adds \x,y\ as an edge if there is a subset Z with size r-2, denoted as Z=\z1,·s,zr-2\, such that \x,zi\ and \y,zi\ for 1≤slant i≤slant r-2 are already edges in the graph and \x,y, z1,·s,zr-2\ is an edge in Hr(n,p). The random triadic process is an abbreviation for the random 3-generalized triadic process. Kor\'andi et al. proved a sharp threshold probability for the propagation of the random triadic process, that is, if p= cn - 12 for some positive constant c, with high probability, the triadic process reaches the complete graph when c> 12 and stops at O(n 32) edges when c< 12. In this note, we consider the final size of the random r-generalized triadic process when p=o( n- 12 α(3-r) n) with a constant α> 12. We show that the generated graph of the process essentially behaves like G(n,p). The final number of added edges in the process, with high probability, equals 12n2p(1 o(1)) provided that p=ω(n-2). The results partially complement the ones on the case of r=3.

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