A neighborhood union condition for the existence of a spanning tree without degree 2 vertices
Abstract
For a connected graph G, a spanning tree T of G is called a homeomorphically irreducible spanning tree (HIST) if T has no vertices of degree 2. In this paper, we show that if G is a graph of order n 270 and |N(u) N(v)|≥n-12 holds for every pair of nonadjacent vertices u and v in G, then G has a HIST, unless G belongs to three exceptional families of graphs or G has a cut-vertex of degree 2. This result improves the latest conclusion, due to Ito and Tsuchiya, that a HIST in G can be guaranteed if d(u)+d(v)≥ n-1 holds for every pair of nonadjacent vertices u and v in G.
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