Cops and robbers for hyperbolic and virtually free groups
Abstract
Lee, Mart\'inez-Pedroza and Rodr\'iguez-Quinche define two new group invariants, the strong cop number sCop and the weak cop number wCop, by examining winning strategies for certain combinatorial games played on Cayley graphs of finitely generated groups. We show that a finitely generated group G is Gromov-hyperbolic if and only if sCop(G) = 1. We show that G is virtually free if and only if wCop(G)=1, answering a question by Cornect and Mart\'inez-Pedroza. We show that sCop(Z2) = ∞, answering a question from the original paper. It is still unknown whether there exist finite cop numbers not equal to 1, but we show that this is not possible for CAT(0)-groups. We provide machinery to explicitly compute strong cop numbers and give examples by applying it to certain lamplighter groups, the solvable Baumslag-Solitar groups, and Thompson's group F.
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