Tree Embeddings and Tree-Star Ramsey Numbers
Abstract
We say that a graph F can be embedded into a graph G if G contains an isomorphic copy of F as a subgraph. Guo and Volkmann GV conjectured that if G is a connected graph with at least n vertices and minimum degree at least n-3, then any tree with n vertices and maximum degree at most n-4 can be embedded into G. In this paper, we give a result slightly stronger than this conjecture and obtain a sufficient and necessary condition that a tree with n vertices and maximum degree at most n-3 can be embedded into a connected graph G with at least n vertices and minimum degree at least n-3. Our result implies that the conjecture of Guo and Volkmann is true with one exception. We also give an application to the Ramsey number of a tree versus a star.
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