Ubiquity in graphs II: Ubiquity of graphs with nowhere-linear end structure
Abstract
A graph G is said to be -ubiquitous, where is the minor relation between graphs, if whenever is a graph with nG for all n ∈ N, then one also has 0 G , where α G is the disjoint union of α many copies of G. A well-known conjecture of Andreae is that every locally finite connected graph is -ubiquitous. In this paper we give a sufficient condition on the structure of the ends of a graph~G which implies that G is -ubiquitous. In particular this implies that the full grid is -ubiquitous.
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