Diameter Bounds for Friends-and-Strangers Graphs

Consider two $n$-vertex graphs $X$ and $Y$, where we interpret $X$ as a social network with edges representing friendships and $Y$ as a movement graph with edges representing adjacent positions. The friends-and-strangers graph $\mathsf{FS}(X,Y)$ is a graph on the $n!$ permutations $V(X)\to V(Y)$, where two configurations are adjacent if and only if one can be obtained from the other by swapping two friends located on adjacent positions. Friends-and-strangers graphs were first introduced by Defant and Kravitz, and generalize sliding puzzles as well as token swapping problems. Previous work has largely focused on their connectivity properties. In this paper, we study the diameter of the connected components of $\mathsf{FS}(X, Y)$. Our main result shows that when the underlying friendship graph is a star with $n$ vertices, the friends-and-strangers graph has components of diameter $O(n^4)$. This implies, in particular, that sliding puzzles are always solvable in polynomially many moves. Our work also provides explicit efficient algorithms for finding these solutions. We then extend our results to general graphs in two ways. First, we show that the diameter is polynomially bounded when both the friendship and the movement graphs have large minimum degree. Second, when both the underlying graphs $X$ and $Y$ are Erd\H{o}s-R\'{e}nyi random graphs, we show that the distance between any pair of configurations is almost always polynomially bounded under certain conditions on the edge probabilities.