A Note on Edge-Colourings Avoiding Rainbow $K_4$ and Monochromatic $K_m$

Veselin Jungić; Tomáš Kaiser; Daniel Král'

doi:10.37236/257

A Note on Edge-Colourings Avoiding Rainbow $K_4$ and Monochromatic $K_m$

The Electronic Journal of Combinatorics ◽

10.37236/257 ◽

2009 ◽

Vol 16 (1) ◽

Author(s):

Veselin Jungić ◽

Tomáš Kaiser ◽

Daniel Král'

Keyword(s):

Lower Bound ◽

Complete Graph ◽

Upper Bound ◽

Projective Planes ◽

Ramsey Number ◽

Complete Subgraph ◽

Finite Projective Planes ◽

Edge Colourings ◽

Edge Colouring

We study the mixed Ramsey number $maxR(n,{K_m},{K_r})$, defined as the maximum number of colours in an edge-colouring of the complete graph $K_n$, such that $K_n$ has no monochromatic complete subgraph on $m$ vertices and no rainbow complete subgraph on $r$ vertices. Improving an upper bound of Axenovich and Iverson, we show that $maxR(n,{K_m},{K_4}) \leq n^{3/2}\sqrt{2m}$ for all $m\geq 3$. Further, we discuss a possible way to improve their lower bound on $maxR(n,{K_4},{K_4})$ based on incidence graphs of finite projective planes.

A (5,5)-Colouring of Kn with Few Colours

Combinatorics Probability Computing ◽

10.1017/s0963548318000172 ◽

2018 ◽

Vol 27 (6) ◽

pp. 892-912

Author(s):

ALEX CAMERON ◽

EMILY HEATH

Keyword(s):

Lower Bound ◽

Complete Graph ◽

Upper Bound ◽

Minimum Number ◽

Edge Colouring

For fixed integers p and q, let f(n,p,q) denote the minimum number of colours needed to colour all of the edges of the complete graph Kn such that no clique of p vertices spans fewer than q distinct colours. Any edge-colouring with this property is known as a (p,q)-colouring. We construct an explicit (5,5)-colouring that shows that f(n,5,5) ≤ n1/3 + o(1) as n → ∞. This improves upon the best known probabilistic upper bound of O(n1/2) given by Erdős and Gyárfás, and comes close to matching the best known lower bound Ω(n1/3).

Total Graph Interpretation of the Numbers of the Fibonacci Type

Journal of Applied Mathematics ◽

10.1155/2015/837917 ◽

2015 ◽

Vol 2015 ◽

pp. 1-7 ◽

Cited By ~ 1

Author(s):

Urszula Bednarz ◽

Iwona Włoch ◽

Małgorzata Wołowiec-Musiał

Keyword(s):

Lower Bound ◽

Upper Bound ◽

Total Graph ◽

Graph Interpretation ◽

Edge Colourings ◽

Almost All ◽

Edge Colouring

We give a total graph interpretation of the numbers of the Fibonacci type. This graph interpretation relates to an edge colouring by monochromatic paths in graphs. We will show that it works for almost all numbers of the Fibonacci type. Moreover, we give the lower bound and the upper bound for the number of all(A1,2A1)-edge colourings in trees.

A Canonical Ramsey Theorem for Exactly m-Coloured Complete Subgraphs

Combinatorics Probability Computing ◽

10.1017/s0963548313000503 ◽

2013 ◽

Vol 23 (1) ◽

pp. 102-115 ◽

Cited By ~ 3

Author(s):

TEERADEJ KITTIPASSORN ◽

BHARGAV P. NARAYANAN

Keyword(s):

Natural Number ◽

Complete Graph ◽

Infinite Subset ◽

Complete Subgraph ◽

Ramsey Theorem ◽

Distinguished Vertex ◽

Edge Colourings ◽

Distinct Colour

Given an edge colouring of a graph with a set of m colours, we say that the graph is exactly m-coloured if each of the colours is used. We consider edge colourings of the complete graph on $\mathbb{N}$ with infinitely many colours and show that either one can find an exactly m-coloured complete subgraph for every natural number m or there exists an infinite subset X ⊂ $\mathbb{N}$ coloured in one of two canonical ways: either the colouring is injective on X or there exists a distinguished vertex v in X such that X\{v} is 1-coloured and each edge between v and X\{v} has a distinct colour (all different to the colour used on X\{v}). This answers a question posed by Stacey and Weidl in 1999. The techniques that we develop also enable us to resolve some further questions about finding exactly m-coloured complete subgraphs in colourings with finitely many colours.

Constrained Ramsey Numbers

Combinatorics Probability Computing ◽

10.1017/s0963548307008875 ◽

2009 ◽

Vol 18 (1-2) ◽

pp. 247-258 ◽

Cited By ~ 1

Author(s):

PO-SHEN LOH ◽

BENNY SUDAKOV

Keyword(s):

Complete Graph ◽

Ramsey Number ◽

Ramsey Numbers ◽

Ramsey Theorem ◽

Logarithmic Factor ◽

Subgraph Isomorphic ◽

Rate Of Growth ◽

Special Cases ◽

Edge Colouring

For two graphs S and T, the constrained Ramsey number f(S, T) is the minimum n such that every edge colouring of the complete graph on n vertices (with any number of colours) has a monochromatic subgraph isomorphic to S or a rainbow subgraph isomorphic to T. Here, a subgraph is said to be rainbow if all of its edges have different colours. It is an immediate consequence of the Erdős–Rado Canonical Ramsey Theorem that f(S, T) exists if and only if S is a star or T is acyclic. Much work has been done to determine the rate of growth of f(S, T) for various types of parameters. When S and T are both trees having s and t edges respectively, Jamison, Jiang and Ling showed that f(S, T) ≤ O(st2) and conjectured that it is always at most O(st). They also mentioned that one of the most interesting open special cases is when T is a path. In this paper, we study this case and show that f(S, Pt) = O(st log t), which differs only by a logarithmic factor from the conjecture. This substantially improves the previous bounds for most values of s and t.

Isomorphic subgraphs having minimal intersections

Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics ◽

10.1017/s1446788700026987 ◽

1983 ◽

Vol 35 (3) ◽

pp. 287-306

Author(s):

R. C. Mullin ◽

B. K. Roy ◽

P. J. Schellenberg

Keyword(s):

Complete Graph ◽

Upper Bound ◽

Packing Problem ◽

Finite Graph ◽

Combinatorial Problems ◽

Set Packing ◽

Complete Subgraph ◽

Special Cases ◽

Set Packing Problem ◽

Special Classes

AbstractGiven a finite graph H and G, a subgraph of it, we define σ (G, H) to be the largest integer such that every pair of subgraphs of H, both isomorphic to G, has at least σ(G, H) edges in common; furthermore, R(G, H) is defined to be the maximum number of subgraphs of H, all isomorphic to G, such that any two of them have σ(G, H) edges common between them. We are interested in the values of σ(G, H) and R(G, H) for general H and G. A number of combinatorial problems can be considered as special cases of this question; for example, the classical set-packing problem is equivalent to evaluating R (G, H) where G is a complete subgraph of the complete graph H and σ(G, H) = 0, and the decomposition of H into subgraphs isomorphic to G is equivalent to showing that σ(G, H) = 0 and R(G, H) = ε(H)/ε(G) where ε(H), ε(G) are the number of edges in H, G respectively.A result of S. M. Johnson (1962) gives an upper bound for R(G, H) in terms of σ(G, H). As a corollary of Johnson's result, we obtain the upper bound of McCarthy and van Rees (1977) for the Cordes problem. The remainder of the paper is a study of σ (G, H) and R(G, H) for special classes of graphs; in particular, H is a complete graph and G is, in most instances, a union of disjoint complete subgraphs.

A Note on Odd Cycle-Complete Graph Ramsey Numbers

The Electronic Journal of Combinatorics ◽

10.37236/1662 ◽

2001 ◽

Vol 9 (1) ◽

Cited By ~ 7

Author(s):

Benny Sudakov

Keyword(s):

Positive Integer ◽

Complete Graph ◽

Upper Bound ◽

Short Note ◽

Ramsey Number ◽

Ramsey Numbers ◽

Odd Cycle

The Ramsey number $r(C_l, K_n)$ is the smallest positive integer $m$ such that every graph of order $m$ contains either cycle of length $l$ or a set of $n$ independent vertices. In this short note we slightly improve the best known upper bound on $r(C_l, K_n)$ for odd $l$.

Induced Ramsey Number for a Star Versus a Fixed Graph

The Electronic Journal of Combinatorics ◽

10.37236/9358 ◽

2021 ◽

Vol 28 (1) ◽

Author(s):

Maria Axenovich ◽

Izolda Gorgol

Keyword(s):

Lower Bound ◽

Chromatic Number ◽

Upper Bound ◽

Constant Factor ◽

Ramsey Number ◽

Large N ◽

Star Versus

We write $F{\buildrel {\text{ind}} \over \longrightarrow}(H,G)$ for graphs $F, G,$ and $H$, if for any coloring of the edges of $F$ in red and blue, there is either a red induced copy of $H$ or a blue induced copy of $G$. For graphs $G$ and $H$, let $\mathrm{IR}(H,G)$ be the smallest number of vertices in a graph $F$ such that $F{\buildrel {\text{ind}} \over \longrightarrow}(H,G)$. In this note we consider the case when $G$ is a star on $n$ edges, for large $n$ and $H$ is a fixed graph. We prove that $$ (\chi(H)-1) n \leq \mathrm{IR}(H, K_{1,n}) \leq (\chi(H)-1)^2n + \epsilon n,$$ for any $\epsilon>0$, sufficiently large $n$, and $\chi(H)$ denoting the chromatic number of $H$. The lower bound is asymptotically tight for any fixed bipartite $H$. The upper bound is attained up to a constant factor, for example when $H$ is a clique.

An Explicit Edge-Coloring of $K_n$ with Six Colors on Every $K_5$

The Electronic Journal of Combinatorics ◽

10.37236/7852 ◽

2019 ◽

Vol 26 (4) ◽

Author(s):

Alex Cameron

Keyword(s):

Lower Bound ◽

Complete Graph ◽

Upper Bound ◽

Edge Coloring ◽

Minimum Number ◽

Positive Integers

Let $p$ and $q$ be positive integers such that $1 \leq q \leq {p \choose 2}$. A $(p,q)$-coloring of the complete graph on $n$ vertices $K_n$ is an edge coloring for which every $p$-clique contains edges of at least $q$ distinct colors. We denote the minimum number of colors needed for such a $(p,q)$-coloring of $K_n$ by $f(n,p,q)$. This is known as the Erdös-Gyárfás function. In this paper we give an explicit $(5,6)$-coloring with $n^{1/2+o(1)}$ colors. This improves the best known upper bound of $f(n,5,6)=O\left(n^{3/5}\right)$ given by Erdös and Gyárfás, and comes close to matching the order of the best known lower bound, $f(n,5,6) = \Omega\left(n^{1/2}\right)$.

Off-Diagonal Ordered Ramsey Numbers of Matchings

The Electronic Journal of Combinatorics ◽

10.37236/8085 ◽

2019 ◽

Vol 26 (2) ◽

Author(s):

Dhruv Rohatgi

Keyword(s):

Lower Bound ◽

Chromatic Number ◽

Upper Bound ◽

Edge Coloring ◽

Ramsey Number ◽

Relative Order ◽

Ramsey Numbers ◽

Asymptotic Bounds ◽

Special Cases ◽

Ordered Graphs

For ordered graphs $G$ and $H$, the ordered Ramsey number $r_<(G,H)$ is the smallest $n$ such that every red/blue edge coloring of the complete ordered graph on vertices $\{1,\dots,n\}$ contains either a blue copy of $G$ or a red copy of $H$, where the embedding must preserve the relative order of vertices. One number of interest, first studied by Conlon, Fox, Lee, and Sudakov, is the off-diagonal ordered Ramsey number $r_<(M, K_3)$, where $M$ is an ordered matching on $n$ vertices. In particular, Conlon et al. asked what asymptotic bounds (in $n$) can be obtained for $\max r_<(M, K_3)$, where the maximum is over all ordered matchings $M$ on $n$ vertices. The best-known upper bound is $O(n^2/\log n)$, whereas the best-known lower bound is $\Omega((n/\log n)^{4/3})$, and Conlon et al. hypothesize that there is some fixed $\epsilon > 0$ such that $r_<(M, K_3) = O(n^{2-\epsilon})$ for every ordered matching $M$. We resolve two special cases of this conjecture. We show that the off-diagonal ordered Ramsey numbers for ordered matchings in which edges do not cross are nearly linear. We also prove a truly sub-quadratic upper bound for random ordered matchings with interval chromatic number $2$.

The Ramsey number of books

Advances in Combinatorics ◽

10.19086/aic.10808 ◽

2019 ◽

Author(s):

David Conlon

Keyword(s):

Complete Graph ◽

Edge Coloring ◽

The Other ◽

Ramsey Number ◽

Natural Question ◽

Probabilistic Argument ◽

Complete Subgraph ◽

Random Construction ◽

Lower Order Terms ◽

Monochromatic Copy

Ramsey's Theorem is among the most well-known results in combinatorics. The theorem states that any two-edge-coloring of a sufficiently large complete graph contains a large monochromatic complete subgraph. Indeed, any two-edge-coloring of a complete graph with N=4t−o(t) vertices contains a monochromatic copy of Kt. On the other hand, a probabilistic argument yields that there exists a two-edge-coloring of a complete graph with N=2t/2+o(t) with no monochromatic copy of Kt. Much attention has been paid to improving these classical bounds but only improvements to lower order terms have been obtained so far. A natural question in this setting is to ask whether every two-edge-coloring of a sufficiently large complete graph contains a monochromatic copy of Kt that can be extended in many ways to a monochromatic copy of Kt+1. Specifically, Erdős, Faudree, Rousseau and Schelp in the 1970's asked whether every two-edge-coloring of KN contains a monochromatic copy of Kt that can be extended in at least (1−ok(1))2−tN ways to a monochromatic copy of Kt+1. A random two-edge-coloring of KN witnesses that this would be best possible. While the intuition coming from random constructions can be misleading, for example, a famous construction by Thomason shows the existence of a two-edge-coloring of a complete graph with fewer monochromatic copies of Kt than a random two-edge-coloring, this paper confirms that the intuition coming from a random construction is correct in this case. In particular, the author answers this question of Erdős et al. in the affirmative. The question can be phrased in the language of Ramsey theory as a problem on determining the Ramsey number of book graphs. A book graph B(k)t is a graph obtained from Kt by adding k new vertices and joining each new vertex to all the vertices of Kt. The main result of the paper asserts that every two-edge-coloring of a complete graph with N=2kt+ok(t) vertices contains a monochromatic copy of B(k)t.