Avoidance Coupling
- Omer Angel ,
- Alexander E. Holroyd ,
- James Martin ,
- David Wilson ,
- Peter Winkler
Electronic Communications in Probability | , Vol 18
We examine the question of whether a collection of random walks on a graph can be coupled so that they never collide. In particular, we show that on the complete graph on n vertices, with or without loops, there is a Markovian coupling keeping apart Ω(n/ log n) random walks, taking turns to move in discrete time.