The multicolour size Ramsey number of a path
Pith reviewed 2026-05-17 20:23 UTC · model grok-4.3
The pith
For fixed r and paths of length k at least 100 log r, the r-colour size Ramsey number of P_k is asymptotically r squared log r times k.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
The r-colour size Ramsey number of the path satisfies hat{R}_r(P_k) = Theta((r^2 log r) k) for every fixed r greater than or equal to 2 and every k at least 100 log r. The authors obtain this by improving the lower bound construction, which now meets the previously known upper bound up to constants.
What carries the argument
The multicolour size Ramsey number hat{R}_r(P_k), the smallest number of edges in a graph such that every r-edge-colouring contains a monochromatic copy of the path P_k.
If this is right
- The required number of edges grows linearly with the path length k.
- The dependence on the number of colours r is quadratic, with an extra logarithmic factor.
- The bound holds uniformly once k exceeds a multiple of log r.
- Lower-bound constructions can be tuned to achieve the matching order for this family of graphs.
Where Pith is reading between the lines
- The same asymptotic shape may persist for k smaller than 100 log r, possibly with different implicit constants.
- The technique of refining lower-bound constructions could determine size Ramsey numbers for other trees or sparse graphs.
- The log r factor may reflect an inherent multicolour phenomenon that appears in related Ramsey problems for paths and cycles.
Load-bearing premise
The path length k must be at least roughly 100 times the logarithm of the number of colours r.
What would settle it
An explicit r-edge-coloured graph with substantially fewer than c r squared log r times k edges, for small enough constant c, that still forces a monochromatic P_k in every colouring.
Figures
read the original abstract
In this paper, we determine the $r$-colour size Ramsey number of the path $P_k$, up to constants. In particular, for every fixed $r \geq 2$ and $k \geq 100\log r$, we have \[ \widehat{R}_r(P_k)=\Theta((r^2 \log r) \, k).\] Perhaps surprisingly, we do this by improving the lower bound on $\widehat{R}_r(P_k)$.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript determines the multicolour size Ramsey number of the path asymptotically, claiming that for every fixed r ≥ 2 and k ≥ 100 log r, the r-colour size Ramsey number satisfieswidehat{R}_r(P_k) = Θ((r² log r) k). The new contribution is an improved probabilistic lower bound; the matching upper bound is inherited from prior work.
Significance. If the lower-bound argument is correct, the result gives a tight asymptotic for the size Ramsey number of paths in the multicolour setting, closing the gap between previous lower and upper bounds and yielding a clean Θ statement. The explicit threshold k ≥ 100 log r is a concrete improvement over earlier logarithmic factors.
major comments (1)
- [Lower-bound construction] Lower-bound section (the probabilistic construction): the argument takes a random r-edge-coloured graph on m ≈ c r² log r ⋅ k edges and applies a union bound to show that the probability of a monochromatic P_k is less than 1. The union bound must absorb an r-factor for the colour choice together with the number of potential embeddings of P_k (which contributes roughly (m choose k) ⋅ k! or equivalent counting terms). When k = Θ(log r) these overhead terms can cancel the main exponential decay; the manuscript asserts that the constant 100 suffices but supplies no explicit numerical verification that 100 dominates the hidden constants arising from the r-colour union bound and the embedding count. This calculation is load-bearing for the claim that the Θ statement holds already at k ≥ 100 log r.
minor comments (2)
- The abstract states the result cleanly but does not indicate which previous bounds are being improved; a single sentence comparing the new lower bound to the best prior lower bound would help readers gauge the advance.
- [Introduction] Notation: ensure that the precise definition of the size Ramsey numberwidehat{R}_r(H) (minimum number of edges guaranteeing a monochromatic copy of H in any r-edge-colouring) appears explicitly before the main theorem.
Simulated Author's Rebuttal
We thank the referee for their thorough reading and for identifying the need for greater explicitness in the lower-bound argument. We address the major comment below and will revise the manuscript accordingly to strengthen the presentation.
read point-by-point responses
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Referee: Lower-bound section (the probabilistic construction): the argument takes a random r-edge-coloured graph on m ≈ c r² log r ⋅ k edges and applies a union bound to show that the probability of a monochromatic P_k is less than 1. The union bound must absorb an r-factor for the colour choice together with the number of potential embeddings of P_k (which contributes roughly (m choose k) ⋅ k! or equivalent counting terms). When k = Θ(log r) these overhead terms can cancel the main exponential decay; the manuscript asserts that the constant 100 suffices but supplies no explicit numerical verification that 100 dominates the hidden constants arising from the r-colour union bound and the embedding count. This calculation is load-bearing for the claim that the Θ statement holds already at k ≥ 100 log r.
Authors: We agree that an explicit verification of the constants would improve clarity. In the proof, the union bound is taken over the r colours and over all ordered sequences of k distinct vertices (at most n^k terms, with n chosen linear in k to support m edges). Each potential path has probability at most (C m / n^2)^k ⋅ r^{-(k-1)} of appearing monochromatically in a fixed colour, where the edge probability is controlled by the random selection of m edges. Substituting m = C r² log r ⋅ k and k ≥ 100 log r yields an overall bound of the form r ⋅ (e C r log r / 100)^k ⋅ r^{-k} times lower-order factors. The base of the exponential is at most (C r log r / 100) ⋅ r^{-1} < 1/2 once C is fixed at a moderate absolute constant (e.g., C=10) and the 100 absorbs the remaining logarithmic and polynomial overhead in r (which is fixed). We will add a short paragraph after the union-bound estimate that carries out this comparison explicitly, confirming that the inequality holds for all r ≥ 2 and k ≥ 100 log r. This does not alter the asymptotic statement but makes the threshold fully rigorous. revision: yes
Circularity Check
No circularity: direct combinatorial determination via probabilistic lower bound
full rationale
The paper determines the multicolour size Ramsey number up to constants by improving the lower bound on the extremal function for paths in r-edge-coloured graphs. This proceeds from standard random-graph techniques and union-bound estimates on monochromatic paths, without any self-definitional reduction, fitted parameter renamed as prediction, or load-bearing self-citation chain that collapses the central claim to its own inputs. The threshold k >= 100 log r is an explicit hypothesis chosen to ensure the probabilistic estimates are positive; it does not create a circular dependency. The result is therefore self-contained against external benchmarks in Ramsey theory.
Axiom & Free-Parameter Ledger
axioms (1)
- standard math Basic facts about paths and edge colourings in finite graphs
Lean theorems connected to this paper
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IndisputableMonolith/Foundation/RealityFromDistinction.leanreality_from_one_distinction unclear?
unclearRelation between the paper passage and the cited Recognition theorem.
Theorem 1.1: for every fixed r ≥ 2 and k ≥ 100 log r, ˆR_r(P_k) = Θ((r² log r) k)
What do these tags mean?
- matches
- The paper's claim is directly supported by a theorem in the formal canon.
- supports
- The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
- extends
- The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
- uses
- The paper appears to rely on the theorem as machinery.
- contradicts
- The paper's claim conflicts with a theorem or certificate in the canon.
- unclear
- Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.
Reference graph
Works this paper leans on
-
[1]
On size Ramsey number of paths, trees, and circuits
J´ ozsef Beck. On size Ramsey number of paths, trees, and circuits. I.J. Graph Theory, 7(1):115–129, 1983
work page 1983
-
[2]
Recent developments in graph Ramsey theory
David Conlon, Jacob Fox, and Benny Sudakov. Recent developments in graph Ramsey theory. InSurveys in combinatorics 2015, volume 424 ofLondon Math. Soc. Lecture Note Ser., pages 49–118. Cambridge Univ. Press, Cambridge, 2015
work page 2015
-
[3]
On some multicolor Ramsey properties of random graphs.SIAM J
Andrzej Dudek and Pawe l Pra lat. On some multicolor Ramsey properties of random graphs.SIAM J. Discrete Math., 31(3):2079–2092, 2017
work page 2079
-
[4]
P. Erd˝ os, R. J. Faudree, C. C. Rousseau, and R. H. Schelp. The size Ramsey number.Period. Math. Hungar., 9(1-2):145–161, 1978
work page 1978
-
[5]
Gaston H. Gonnet. Expected length of the longest probe sequence in hash code searching.J. Assoc. Comput. Mach., 28(2):289–304, 1981
work page 1981
-
[6]
Lars Holst. The general birthday problem. InProceedings of the Sixth International Seminar on Random Graphs and Probabilistic Methods in Combinatorics and Computer Science, “Random Graphs ’93” (Pozna´ n, 1993), volume 6, pages 201–208, 1995
work page 1993
-
[7]
Jovan D. Keˇ cki´ c and Petar M. Vasi´ c. Some inequalities for the gamma function.Publ. Inst. Math. (Beograd) (N.S.), 11(25):107–114, 1971
work page 1971
-
[8]
Long cycles in locally expanding graphs, with applications.Combinatorica, 39(1):135–151, 2019
Michael Krivelevich. Long cycles in locally expanding graphs, with applications.Combinatorica, 39(1):135–151, 2019
work page 2019
-
[9]
Marshall and Ingram Olkin.Inequalities: Theory of Majorization and Its Applications
Albert W. Marshall and Ingram Olkin.Inequalities: Theory of Majorization and Its Applications. Aca- demic Press, New York, 1979
work page 1979
-
[10]
D. S. Mitrinovi´ c.Analytic inequalities, volume Band 165 ofDie Grundlehren der mathematischen Wis- senschaften. Springer-Verlag, New York-Berlin, 1970. In cooperation with P. M. Vasi´ c
work page 1970
-
[11]
Cambridge University Press, Cam- bridge, second edition, 2017
Michael Mitzenmacher and Eli Upfal.Probability and computing. Cambridge University Press, Cam- bridge, second edition, 2017. Randomization and probabilistic techniques in algorithms and data anal- ysis
work page 2017
-
[12]
Martin Raab and Angelika Steger. “Balls into bins”—a simple and tight analysis. InRandomization and approximation techniques in computer science (Barcelona, 1998), volume 1518 ofLecture Notes in Comput. Sci., pages 159–170. Springer, Berlin, 1998. AppendixA.Deferred analysis of balls-and-bins In this appendix, we study theballs and bins problem, and we re...
work page 1998
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[13]
We first quote an estimate from [7], which is a generalisation of Stirling’s approximation
Therefore, EI (1) t I(2) t ⩽ n−tX k=t n k pk(1−p) n−kep2n+pP[Bin (n, p)⩾t] = exp n q2 + 1 q EI (1) t 2 .□ We will also need the following inequalities to analyse the tails of certain binomial ran- dom variables. We first quote an estimate from [7], which is a generalisation of Stirling’s approximation. Theorem A.8.Forx∈R ⩾0, we have √ 2πxx+ 1 2 e−x+ 1 12x...
discussion (0)
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