The critical Karp--Sipser core of Erdos--R\'enyi random graphs

Abstract

The Karp--Sipser algorithm consists in removing recursively the leaves as well their unique neighbours and all isolated vertices of a given graph. The remaining graph obtained when there is no leaf left is called the Karp--Sipser core. When the underlying graph is the classical sparse Erdos--R\'enyi random graph G[n, λ/n], it is known to exhibit a phase transition at λ = e. We show that at criticality, the Karp--Sipser core has size of order n3/5, which proves a conjecture of Bauer and Golinelli. We provide the asymptotic law of this renormalized size as well as a description of the distribution of the core as a graph. Our approach relies on the differential equation method, and builds up on a previous work on a configuration model with bounded degrees.

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