Add to ORKGIn 1967, Erdős asked for the greatest chromatic number, $f(n)$, amongst all $n$-vertex, triangle-free graphs. An observation of Erd\H{o}s and Hajnal together with Shearer's classical upper bound for the off-diagonal Ramsey number $R(3, t)$ shows that $f(n)$ is at most $(2 \sqrt{2} + o(1)) \sqrt{n/\log n}$. We improve this bound by a factor $\sqrt{2}$, as well as obtaining an analogous bound on the list chromatic number which is tight up to a constant factor. A bound in terms of the number of edges that is similarly tight follows, and these results confirm a conjecture of Cames van Batenburg, de Joannis de Verclos, Kang, and Pirot.</p
Using computational techniques we derive six new upper bounds on the classical two-color Ramsey numb...
The Ramsey number r(G) of a graph G is the smallest number n such that, in any two-colouring of the ...
AbstractThe Ramsey number r(G) of a graph G is the minimum N such that every red–blue coloring of th...
Let Q(n, χ) denote the minimum clique size an n-vertex graph can have if its chromatic number is χ. ...
AbstractWe present a simple explicit construction, in terms of t, of a graph that is triangle-free, ...
AbstractBy applying a look-ahead algorithm, we show that there are, up to isomorphism, exactly two c...
The Ramsey number R(F, H) is the minimum number N such that any N-vertex graph either contains a cop...
In 1930, Frank Ramsey showed that one will find a monochromatic clique of a specified size in any ed...
AbstractAjtai, Komlós, and Szemerédi (J. Combin. Theory Ser. A 29 (1980), 354–360) recently announce...
Let G be a claw-free graph on n vertices with clique number ω, and consider the chromatic number χ(G...
AbstractThe Ramsey number r(H,G) is defined as the minimum N such that for any coloring of the edges...
AbstractCombining recent results on colorings and Ramsey theory, we show that if G is a triangle-fre...
We show that, in any coloring of the edges of K38 with two colors, there exists a triangle in the fi...
A triangle in a hypergraph is a collection of distinct vertices u, v, w and distinct edges e, f, g w...
Abstract. In this paper we show that R(3, 3, 3, 3) ≤ 62, that is, any edge coloring of a complete g...
Using computational techniques we derive six new upper bounds on the classical two-color Ramsey numb...
The Ramsey number r(G) of a graph G is the smallest number n such that, in any two-colouring of the ...
AbstractThe Ramsey number r(G) of a graph G is the minimum N such that every red–blue coloring of th...
Let Q(n, χ) denote the minimum clique size an n-vertex graph can have if its chromatic number is χ. ...
AbstractWe present a simple explicit construction, in terms of t, of a graph that is triangle-free, ...
AbstractBy applying a look-ahead algorithm, we show that there are, up to isomorphism, exactly two c...
The Ramsey number R(F, H) is the minimum number N such that any N-vertex graph either contains a cop...
In 1930, Frank Ramsey showed that one will find a monochromatic clique of a specified size in any ed...
AbstractAjtai, Komlós, and Szemerédi (J. Combin. Theory Ser. A 29 (1980), 354–360) recently announce...
Let G be a claw-free graph on n vertices with clique number ω, and consider the chromatic number χ(G...
AbstractThe Ramsey number r(H,G) is defined as the minimum N such that for any coloring of the edges...
AbstractCombining recent results on colorings and Ramsey theory, we show that if G is a triangle-fre...
We show that, in any coloring of the edges of K38 with two colors, there exists a triangle in the fi...
A triangle in a hypergraph is a collection of distinct vertices u, v, w and distinct edges e, f, g w...
Abstract. In this paper we show that R(3, 3, 3, 3) ≤ 62, that is, any edge coloring of a complete g...
Using computational techniques we derive six new upper bounds on the classical two-color Ramsey numb...
The Ramsey number r(G) of a graph G is the smallest number n such that, in any two-colouring of the ...
AbstractThe Ramsey number r(G) of a graph G is the minimum N such that every red–blue coloring of th...