Bounds of a number of leaves of spanning trees

Abstract

We prove that every connected graph with s vertices of degree not 2 has a spanning tree with at least 1 4(s-2)+2 leaves. Let G be a be a connected graph of girth g with v>1 vertices. Let maximal chain of successively adjacent vertices of degree 2 in the graph G does not exceed k 1. We prove that G has a spanning tree with at least αg,k(v(G)-k-2)+2 leaves, where αg,k= [g+12] [g+12](k+3)+1 for k<g-2; αg,k= g-2 (g-1)(k+2) for k g-2. We present infinite series of examples showing that all these bounds are exact.