Stable Leader Election in Population Protocols Requires Linear Time

Abstract

A population protocol *stably elects a leader* if, for all n, starting from an initial configuration with n agents each in an identical state, with probability 1 it reaches a configuration y that is correct (exactly one agent is in a special leader state ) and stable (every configuration reachable from y also has a single agent in state ). We show that any population protocol that stably elects a leader requires (n) expected "parallel time" --- (n2) expected total pairwise interactions --- to reach such a stable configuration. Our result also informs the understanding of the time complexity of chemical self-organization by showing an essential difficulty in generating exact quantities of molecular species quickly.