For the Erd\H{o}s-R\'enyi random graph G(n,p), we give a precise asymptotic
formula for the size of a largest vertex subset in G(n,p) that induces a
subgraph with average degree at most t, provided that p = p(n) is not too small
and t = t(n) is not too large. In the case of fixed t and p, we find that this
value is asymptotically almost surely concentrated on at most two explicitly
given points. This generalises a result on the independence number of random
graphs. For both the upper and lower bounds, we rely on large deviations
inequalities for the binomial distribution.Comment: 15 page

Fountoulakis, Nikolaos

Kang, Ross J.

McDiarmid, Colin

English

arXiv

For the Erdős–Rényi random graph Gn,pGn,p, we give a precise asymptotic formula for the size αˆt(Gn,p) of a largest vertex subset in Gn,pGn,p that induces a subgraph with average degree at most tt, provided that p=p(n)p=p(n) is not too small and t=t(n)t=t(n) is not too large. In the case of fixed tt and pp, we find that this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution

Kang, Ross

Sub Stochastics and Decision Theory begr

Mathematical Modeling

NARCIS 

Largest sparse subgraphs of random graphs

For the Erdős–Rényi random graph Gn,p, we give a precise asymptotic formula for the size αˆt(Gn,p) of a largest vertex subset in Gn,p that induces a subgraph with average degree at most t, provided that p=p(n) is not too small and t=t(n) is not too large. In the case of fixed t and p, we find that this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution.</p

Kang, RJ

McDiarmid, C

University of Birmingham Research Portal

Nikolaos Fountoulakis

Ross J. Kang

Colin Mcdiarmid

CiteSeerX

For the Erdos-Rényi random graph Gn,p, we consider the order of a largest vertex subset that induces a subgraph with average degree at most t. For the case when both p and t are fixed, this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution.</p

For the Erdos-Rényi random graph Gn,p, we consider the order of a largest vertex subset that induces a subgraph with average degree at most t. For the case when both p and t are fixed, this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution. © 2011 Elsevier B.V

Fountoulakis, N

Oxford University Research Archive (ORA)

Electronic Notes in Discrete Mathematics

Largest sparse subgraphs of random graphs.

AbstractFor the Erdős–Rényi random graph Gn,p, we give a precise asymptotic formula for the size αˆt(Gn,p) of a largest vertex subset in Gn,p that induces a subgraph with average degree at most t, provided that p=p(n) is not too small and t=t(n) is not too large. In the case of fixed t and p, we find that this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution

Elsevier - Publisher Connector 

Largest sparse subgraphs of random graphs 

For the Erdo{double acute}s-Rényi random graph G n,p, we give a precise asymptotic formula for the size α̂t(Gn,p) of a largest vertex subset in G n,p that induces a subgraph with average degree at most t, provided that p = p (n) is not too small and t = t (n) is not too large. In the case of fixed t and p, we find that this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution. © 2013 Elsevier Ltd

Oxford University Research Archive

For the Erdős–Rényi random graph Gn,p, we give a precise asymptotic formula for the size â1(Gn,p) of a largest vertex subset in Gn,p that induces a subgraph with average degree at most t, provided that p=p(n) is not too small and t=t(n) is not too large. In the case of fixed t and p, we find that this value is asymptotically almost surely concentrated on at most two explicitly given points. This generalises a result on the independence number of random graphs. For both the upper and lower bounds, we rely on large deviations inequalities for the binomial distribution

Largest sparse subgraphs of random graphs

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University of Birmingham Research Portal

Oxford University Research Archive (ORA)

Elsevier - Publisher Connector

Elsevier - Publisher Connector

Oxford University Research Archive

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