The critical Karp--Sipser core of random graphs

Abstract

We study the Karp--Sipser core of a random graph made of a configuration model with vertices of degree 1,2 and 3. This core is obtained by recursively removing the leaves as well as their unique neighbors in the graph. We settle a conjecture of Bauer & Golinelli and prove that at criticality, the Karp--Sipser core has size ≈ Cst · -2 · n3/5 where is the hitting time of the curve t 1t2 by a linear Brownian motion started at 0. Our proof relies on a detailed multi-scale analysis of the Markov chain associated to Karp-Sipser leaf-removal algorithm close to its extinction time.

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