Spanning trees with many leaves: new lower bounds in terms of number of vertices of degree~3 and at least~4

Abstract

We prove, that every connected graph with s vertices of degree 3 and t vertices of degree at least~4 has a spanning tree with at least 2 5t +1 5s+α leaves, where α 8 5. Moreover, α 2 for all graphs besides three exclusions. All exclusion are regular graphs of degree~4, they are explicitly described in the paper. We present infinite series of graphs, containing only vertices of degrees~3 and~4, for which the maximal number of leaves in a spanning tree is equal for 2 5t +1 5s+2. Therefore we prove that our bound is tight.