A sharp upper bound for the number of connected sets in any grid graph

Abstract

A connected set in a graph is a subset of vertices whose induced subgraph is connected. Although counting the number of connected sets in a graph is generally a \#P-complete problem, it remains an active area of research. In 2020, Vince posed the problem of finding a formula for the number of connected sets in the (n× n)-grid graph. In this paper, we establish a sharp upper bound for the number of connected sets in any grid graph by using multistep recurrence formulas, which further derives enumeration formulas for the numbers of connected sets in (3× n)- and (4× n)-grid graphs, thus solving a special case of the general problem posed by Vince. In the process, we also determine the number of connected sets of Km× Pn by employing the transfer matrix method, where Km× Pn is the Cartesian product of the complete graph of order m and the path of order n.

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