Add to ORKGIn this note, we revisit the problem of calculating small on-line Ramsey numbers R(G,H). A new approach is proposed that reduces the running time of the algorithm determining that R(K_3,K_4)=17 by a factor of at least 2*10^6 comparing to the previously used approach. Using high performance computing networks, we determined that R(K_4,K_4) <= 26, R(K_3,K_5) < 25, and that R(K_3,K_3,K_3) <= 20 for a natural generalization to three colours. All graphs on 3 or 4 vertices are investigated as well, including non-symmetric cases
The Ramsey numbers for a graph G versus a graph H, denoted by R(G,H) is the smallest positive intege...
AbstractWith the help of a computer, the Ramsey numbers r3(H) are obtained for each of the 19 graphs...
We divide our attention between two open problems. One of them is to find better lower bounds on Ram...
In this note, we revisit the problem of calculating small on-line Ramsey numbers R(G,H). A new appro...
Tyt. z nagłówka.Bibliogr. s. 468.We consider on-line Ramsey numbers defined by a game played between...
The Ramsey number R(C4,Km) is the smallest n such that any graph on n vertices contains a cycle of l...
We study on-line version of size-Ramsey numbers of graphs defined via a game played between Builder ...
Graphs and AlgorithmsWe study on-line version of size-Ramsey numbers of graphs defined via a game pla...
Abstract. We give exact values for certain small 2-colour Ramsey numbers in graphs. In particular, w...
The Ramsey number R(C4, Km) is the smallest n such that any graph on n vertices contains a cycle of ...
A graph with many vertices cannot be homogeneous, i.e., for any pair of integers (i,j) all large gra...
AbstractConsidering a known upper bound, the exact value of the Ramsey number r(K2,2,K3,n) is determ...
In this note an adaptation of heuristic tabu search algorithm for finding Ramsey graphs is presented...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
This thesis contains new contributions to Ramsey theory, in particular results that establish exact ...
The Ramsey numbers for a graph G versus a graph H, denoted by R(G,H) is the smallest positive intege...
AbstractWith the help of a computer, the Ramsey numbers r3(H) are obtained for each of the 19 graphs...
We divide our attention between two open problems. One of them is to find better lower bounds on Ram...
In this note, we revisit the problem of calculating small on-line Ramsey numbers R(G,H). A new appro...
Tyt. z nagłówka.Bibliogr. s. 468.We consider on-line Ramsey numbers defined by a game played between...
The Ramsey number R(C4,Km) is the smallest n such that any graph on n vertices contains a cycle of l...
We study on-line version of size-Ramsey numbers of graphs defined via a game played between Builder ...
Graphs and AlgorithmsWe study on-line version of size-Ramsey numbers of graphs defined via a game pla...
Abstract. We give exact values for certain small 2-colour Ramsey numbers in graphs. In particular, w...
The Ramsey number R(C4, Km) is the smallest n such that any graph on n vertices contains a cycle of ...
A graph with many vertices cannot be homogeneous, i.e., for any pair of integers (i,j) all large gra...
AbstractConsidering a known upper bound, the exact value of the Ramsey number r(K2,2,K3,n) is determ...
In this note an adaptation of heuristic tabu search algorithm for finding Ramsey graphs is presented...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
This thesis contains new contributions to Ramsey theory, in particular results that establish exact ...
The Ramsey numbers for a graph G versus a graph H, denoted by R(G,H) is the smallest positive intege...
AbstractWith the help of a computer, the Ramsey numbers r3(H) are obtained for each of the 19 graphs...
We divide our attention between two open problems. One of them is to find better lower bounds on Ram...