On the Mean Order of Connected Induced Subgraphs of Block Graphs

Abstract

The average order of the connected induced subgraphs of a graph G is called the mean connected induced subgraph (CIS) order of G. This is an extension of the mean subtree order of a tree, first studied by Jamison. In this article, we demonstrate that among all connected block graphs of order n, the path Pn has minimum mean CIS order. This extends a result of Jamison from trees to connected block graphs, and supports the conjecture of Kroeker, Mol, and Oellermann that Pn has minimum mean CIS order among all connected graphs of order n.