Expansion in Supercritical Random Subgraphs of Expanders and its Consequences

Abstract

In 2004, Frieze, Krivelevich and Martin [17] established the emergence of a giant component in random subgraphs of pseudo-random graphs. We study several typical properties of the giant component, most notably its expansion characteristics. We establish an asymptotic vertex expansion of connected sets in the giant by a factor of O(ε2). From these expansion properties, we derive that the diameter of the giant is typically Oε( n), and that the mixing time of a lazy random walk on the giant is asymptotically Oε(2 n). We also show similar asymptotic expansion properties of (not necessarily connected) linear sized subsets in the giant, and the typical existence of a large expander as a subgraph.

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