Combinatorial theorems in sparse random sets
- Creators
- Conlon, D.
- Gowers, W. T.
Abstract
We develop a new technique that allows us to show in a unified way that many well-known combinatorial theorems, including Turán's theorem, Szemerédi's theorem and Ramsey's theorem, hold almost surely inside sparse random sets. For instance, we extend Turán's theorem to the random setting by showing that for every ϵ > 0 and every positive integer t ≥ 3 there exists a constant C such that, if G is a random graph on n vertices where each edge is chosen independently with probability at least Cn^(−2/(t+1)), then, with probability tending to 1 as n tends to infinity, every subgraph of G with at least (1 – (1/(t−1)) + ϵ)e(G) edges contains a copy of K_t. This is sharp up to the constant C. We also show how to prove sparse analogues of structural results, giving two main applications, a stability version of the random Turán theorem stated above and a sparse hypergraph removal lemma. Many similar results have recently been obtained independently in a different way by Schacht and by Friedgut, Rödl and Schacht.
Additional Information
© 2016 D. Conlon and W.T. Gowers; this is the published version of arXiv 1011.4310. Received 18 November 2010; revised 2 February 2015; accepted 7 April 2016; published online 29 July 2016. Research of D.C. supported by a Royal Society University Research Fellowship. Research of W.T.G. supported by a Royal Society 2010 Anniversary Research Professorship.Attached Files
Published - 44072019.pdf
Submitted - 1011.4310.pdf
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Additional details
- Eprint ID
- 97813
- Resolver ID
- CaltechAUTHORS:20190812-162957976
- Royal Society
- Created
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2019-08-15Created from EPrint's datestamp field
- Updated
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2021-11-16Created from EPrint's last_modified field