New bounds for the distance Ramsey number
Abstract
In this paper we study the distance Ramsey number R D(s,t,d). The distance Ramsey number R D(s,t,d) is the minimum number n such that for any graph G on n vertices, either G contains an induced s -vertex subgraph isomorphic to a distance graph in d or G contains an induced t -vertex subgraph isomorphic to the distance graph in d . We obtain the upper and lower bounds on R D(s,s,d), which are similar to the bounds for the classical Ramsey number R( s[d/2] , s[d/2] ).
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