Add to ORKGThe core idea of Ramsey theory is that complete disorder is impossible. Given a large structure, no matter how complex it is, we can always find a smaller substructure that has some sort of order. One view of this problem is in edge-colorings of complete graphs. For any graphs G, H1, ..., Hk, we write G → (H1, ..., Hk), or G → (H)k when H1 = ··· = Hk = H, if every k-edge-coloring of G contains a monochromatic Hi in color i for some i ∈ {1,...,k}. The Ramsey number rk(H1, ..., Hk) is the minimum integer n such that Kn → (H1, ..., Hk), where Kn is the complete graph on n vertices. Computing rk(H1, ..., Hk) is a notoriously difficult problem in combinatorics. A weakening of this problem is to restrict ourselves to Gallai colorings, that is, ed...
AbstractFor the graphs K7 − 2P2 and K7 − 3P2 we give a proof of their triangle-graph Ramsey numbers ...
The Ramsey number r(C_k, C_k, C_k), denoted as r_3(C_k), is the smallest positive integer n such tha...
A Gallai-coloring (Gallai-k-coloring) is an edge-coloring (with colors from {1,2,…,k}) of a complete...
In 1930, Frank Ramsey showed that one will find a monochromatic clique of a specified size in any ed...
Given a graph G and a positive integer k, define the Gallai-Ramsey number to be the minimum number o...
This dissertation explores two separate topics on graphs. We first study a far-reaching generalizati...
Given a graph $G$, we consider the problem of finding the minimum number $n$ such that any $k$ edge ...
Given a graph H and a positive integer k, the k-color Gallai-Ramsey number grk(K3 : H) is defined to...
AbstractFor given graphs G and H and an integer k, the Gallai–Ramsey number is defined to be the min...
For graphs G1, G2, G3, the three-color Ramsey number R(G1, G2, G3) is the smallest integer n such th...
AbstractFor given graphs G1,G2,G3, the three-color Ramsey number R(G1,G2,G3) is defined to be the le...
An edge-colored cycle is rainbow if its edges are colored with distinct colors. A Gallai (multi)grap...
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
Ramsey Theory studies conditions when a combinatorial object contains necessarily some smaller given...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
AbstractFor the graphs K7 − 2P2 and K7 − 3P2 we give a proof of their triangle-graph Ramsey numbers ...
The Ramsey number r(C_k, C_k, C_k), denoted as r_3(C_k), is the smallest positive integer n such tha...
A Gallai-coloring (Gallai-k-coloring) is an edge-coloring (with colors from {1,2,…,k}) of a complete...
In 1930, Frank Ramsey showed that one will find a monochromatic clique of a specified size in any ed...
Given a graph G and a positive integer k, define the Gallai-Ramsey number to be the minimum number o...
This dissertation explores two separate topics on graphs. We first study a far-reaching generalizati...
Given a graph $G$, we consider the problem of finding the minimum number $n$ such that any $k$ edge ...
Given a graph H and a positive integer k, the k-color Gallai-Ramsey number grk(K3 : H) is defined to...
AbstractFor given graphs G and H and an integer k, the Gallai–Ramsey number is defined to be the min...
For graphs G1, G2, G3, the three-color Ramsey number R(G1, G2, G3) is the smallest integer n such th...
AbstractFor given graphs G1,G2,G3, the three-color Ramsey number R(G1,G2,G3) is defined to be the le...
An edge-colored cycle is rainbow if its edges are colored with distinct colors. A Gallai (multi)grap...
Establishing the values of Ramsey numbers is, in general, a difficult task from the computational po...
Ramsey Theory studies conditions when a combinatorial object contains necessarily some smaller given...
Given a graph H, the Ramsey number r(H) is the smallest natural number N such that any two-colouring...
AbstractFor the graphs K7 − 2P2 and K7 − 3P2 we give a proof of their triangle-graph Ramsey numbers ...
The Ramsey number r(C_k, C_k, C_k), denoted as r_3(C_k), is the smallest positive integer n such tha...
A Gallai-coloring (Gallai-k-coloring) is an edge-coloring (with colors from {1,2,…,k}) of a complete...