Cops and Robbers, Clique Covers, and Induced Cycles

Abstract

We consider the Cops and Robbers game played on finite simple graphs. In a graph G, the number of cops required to capture a robber in the Cops and Robbers game is denoted by c(G). For all graphs G, c(G) ≤ α(G) ≤ θ(G) where α(G) and θ(G) are the independence number and clique cover number respectively. In 2022 Turcotte asked if c(G) < α(G) for all graphs with α(G) ≥ 3. Recently, Char, Maniya, and Pradhan proved this is false, at least when α = 3,by demonstrating the compliment of the Shrikhande graph has cop number and independence number 3. We prove, using random graphs, the stronger result that for all k≥ 1 there exists a graph G such that c(G) = α(G) = θ(G) = k. Next, we consider the structure of graphs with c(G) = θ(G) ≥ 3. We prove, using structural arguments, that any graphs G which satisfies c(G) = θ(G) = k ≥ 3 contain induced cycles of all lengths 3≤ t ≤ k+1. This implies all perfect graphs G with α(G)≥ 4 have c(G) < α(G). Additionally,we discuss if typical triangle-free and C4-free graphs will have c(G) < α(G).