Random Kk-removal algorithm

Abstract

One interesting question is how a graph develops from some constrained random graph process, which is a fundamental mechanism in the formation and evolution of dynamic networks. The problem here is referred to the random Kk-removal algorithm. For a fixed integer k≥slant 3, it starts with a complete graph on n→∞ vertices and iteratively removes the edges of an uniformly chosen Kk. This algorithm terminates once no Kks remain and at the same time it generates one linear k-uniform hypergraph. For k=3, it was shown that the size in the final graph is n3/2+o(1). Less results are on the cases when k≥slant 4. In this paper, we prove that the exact expected trajectories of various key parameters in the algorithm to some iteration such that the final size in the algorithm is at most n2-1/(k(k-1)-2)+o(1) for k≥slant 4. We also show the bound is a natural barrier.