The number and average size of connected sets in graphs with degree constraints

TL;DR

This paper investigates how degree constraints in graphs influence the number and size of connected vertex subsets, providing bounds and generalizations related to degree distributions and their impact on connected set density.

Contribution

It offers new bounds on the growth rate of connected sets in graphs with degree constraints and generalizes classical results on connected set density.

Findings

Bounded the maximum growth rate of connected sets in cubic graphs.

Connected set density is bounded away from 1 in graphs without degree-2 vertices.

Connected set density approaches 1/2 as minimum degree tends to infinity.

Abstract

The average size of connected vertex subsets of a connected graph generalises a much-studied parameter for subtrees of trees. For trees, the possible values of this parameter are critically affected by the presence or absence of vertices of degree 2. We answer two questions of Andrew Vince regarding the effect of degree constraints on general connected graphs. We give a new lower bound, and the first non-trivial upper bound, on the maximum growth rate of the number of connected sets of a cubic graph, and in fact obtain non-trivial upper bounds for any constant bound on the maximum degree. We show that the average connected set density is bounded away from 1 for graphs with no vertex of degree 2, and generalise a classical result of Jamison for trees by showing that in order for the connected set density to approach 1, the proportion of vertices of degree 2 must approach 1. Finally, we show that any sequence of graphs with minimum degree tending to infinity must have connected set density tending to 1/2.