Intersecting Families of Spanning Trees
Abstract
A family F of spanning trees of the complete graph on n vertices Kn is t-intersecting if any two members have a forest on t edges in common. We prove an Erdos--Ko--Rado result for t-intersecting families of spanning trees of Kn. In particular, we show there exists a constant C > 0 such that for all n ≥ C ( n) t the largest t-intersecting families are the families consisting of all trees that contain a fixed set of t disjoint edges (as well as the stars on n vertices for t = 1). The proof uses the spread approximation technique in conjunction with the Lopsided Lov\'asz Local Lemma.
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