The vertex sets of subtrees of a tree
Abstract
Let F be a set of subsets of a set W. When is there a tree T with vertex set W such that each member of F is the set of vertices of a subtree of T? It is necessary that F has the Helly property and the intersection graph of F is chordal. We will show that these two necessary conditions are together sufficient in the finite case, and more generally, they are sufficient if no element of W belongs to infinitely many infinite sets in F.
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