Published August 2022
| public
Journal Article
Threshold Ramsey multiplicity for odd cycles
- Creators
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Conlon, David
- Fox, Jacob
- Sudakov, Benny
- Wei, Fan
Abstract
The Ramsey number r(H) of a graph H is the minimum n such that any two-coloring of the edges of the complete graph Kₙ contains a monochromatic copy of H. The threshold Ramsey multiplicity m(H) is then the minimum number of monochromatic copies of H taken over all two-edge-colorings of K_(r(H)). The study of this concept was first proposed by Harary and Prins almost fifty years ago. In a companion paper, the authors have shown that there is a positive constant c such that the threshold Ramsey multiplicity for a path or even cycle with k vertices is at least (ck)ᵏ, which is tight up to the value of c. Here, using different methods, we show that the same result also holds for odd cycles with k vertices.
Additional Information
The first author [Conlon] is supported by NSF Award DMS-2054452. The second author [Fox] is supported by a Packard Fellowship and by NSF Award DMS-1855635. The third author [Sudakov] is supported by SNSF grant 200021_196965. The last author [Wei] is supported by NSF Award DMS-1953958.Additional details
- Eprint ID
- 117741
- Resolver ID
- CaltechAUTHORS:20221107-997760900.3
- DMS-2054452
- NSF
- DMS-1855635
- NSF
- 200021_196965
- Swiss National Science Foundation (SNSF)
- DMS-1953958
- NSF
- Created
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2022-11-17Created from EPrint's datestamp field
- Updated
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2022-11-17Created from EPrint's last_modified field