Largest component of subcritical random graphs with given degree sequence
View/Open
Cita com:
hdl:2117/406424
Document typeArticle
Defense date2023-02
PublisherProject Euclid
Rights accessOpen Access
Except where otherwise noted, content on this work
is licensed under a Creative Commons license
:
Attribution 4.0 International
ProjectCOMBINATORIA GEOMETRICA, ALGEBRAICA Y PROBABILISTICA (AEI-MTM2017-82166-P)
COMBINATORIA: NUEVAS TENDENCIAS Y APLICACIONES (AEI-PID2020-113082GB-I00)
COMBINATORIA: NUEVAS TENDENCIAS Y APLICACIONES (AEI-PID2020-113082GB-I00)
Abstract
We study the size of the largest component of two models of random graphs with prescribed degree sequence, the configuration model (CM) and the uniform model (UM), in the (barely) subcritical regime. For the CM, we give upper bounds that are asymptotically tight for certain degree sequences. These bounds hold under mild conditions on the sequence and improve previous results of Hatami and Molloy on the barely subcritical regime. For the UM, we give weaker upper bounds that are tight up to logarithmic terms but require no assumptions on the degree sequence. In particular, the latter result applies to degree sequences with infinite variance in the subcritical regime.
CitationCoulson, M.; Perarnau-Llobet, G. Largest component of subcritical random graphs with given degree sequence. "Electronic journal of probability", Febrer 2023, vol. 28, p. 1-28.
ISSN1083-6489
Files | Description | Size | Format | View |
---|---|---|---|---|
paper_subcritical.pdf | 383,8Kb | View/Open |