Abstract
Let A be an arbitrary locally finite, infinite tree and assume that a graph G contains for every positive integer n a system of n disjoint graphs each isomorphic to a subdivision of A. Then G contains infinitely many disjoint subgraphs each isomorphic to a subdivision of A. This sharpens a theorem of Halin [5], who proved the corresponding result for the case that A is a tree in which each vertex has degree not greater than 3.
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