On basis of two definitions that 1. an induced subgraph by a vertex vi E G and its neighbors in G is defined a vertex adjacent closed subgraph denoted by Qi (=G[V(Nvi)]), with the vertex vi called the hub; 2. A r...On basis of two definitions that 1. an induced subgraph by a vertex vi E G and its neighbors in G is defined a vertex adjacent closed subgraph denoted by Qi (=G[V(Nvi)]), with the vertex vi called the hub; 2. A r(k,1)-1 vertices connected graph is called a (k,l)-Ramsey graph denoted by RG(k,l),if and only if 1. RG(k,l) contains only cliques of degree k-1, and its complement contains only cliques of degree l-l; 2. the intersect Qi∩Qj of any two nonadjacent vertices vi and vj of RG(k,1) contains Kk.2, and the intersect Qi∩Qj of any two nonadjacent vertices vi and vj of its complement RG(l,k) contains KI.2. Two theorems that theoreml : the biggest clique in G is contained in some Qi of G, and theorem2: r(k,l)= [ V(RG(k,I)) I +1 are put forward and proved in this paper. With those definitions and theorems as well as analysis of property of chords a method for quick inspection and building RG(k,I) is proposed. Accordingly, RG(10,3) and its complement are built, which are respectively the strongly 29-regular graph and the strongly 10-regular graph on orders 40. We have tested RG(10,3) and its complement RG(3,10),and gotten r(3,10)=41.展开更多
文摘On basis of two definitions that 1. an induced subgraph by a vertex vi E G and its neighbors in G is defined a vertex adjacent closed subgraph denoted by Qi (=G[V(Nvi)]), with the vertex vi called the hub; 2. A r(k,1)-1 vertices connected graph is called a (k,l)-Ramsey graph denoted by RG(k,l),if and only if 1. RG(k,l) contains only cliques of degree k-1, and its complement contains only cliques of degree l-l; 2. the intersect Qi∩Qj of any two nonadjacent vertices vi and vj of RG(k,1) contains Kk.2, and the intersect Qi∩Qj of any two nonadjacent vertices vi and vj of its complement RG(l,k) contains KI.2. Two theorems that theoreml : the biggest clique in G is contained in some Qi of G, and theorem2: r(k,l)= [ V(RG(k,I)) I +1 are put forward and proved in this paper. With those definitions and theorems as well as analysis of property of chords a method for quick inspection and building RG(k,I) is proposed. Accordingly, RG(10,3) and its complement are built, which are respectively the strongly 29-regular graph and the strongly 10-regular graph on orders 40. We have tested RG(10,3) and its complement RG(3,10),and gotten r(3,10)=41.
