Stable Tables
Abstract
We consider equilibrium one-on-one conversations between neighbors on a circular table, with the goal of assessing the likelihood of a (perhaps) familiar situation: sitting at a table where both of your neighbors are talking to someone else. When n people in a circle randomly prefer their left or right neighbor, we show that the probability a given person is unmatched in equilibrium (i.e., in a stable matching) is 19 + (12)n(2n3 - 89 + 2n) for odd n and 19 - (12)n(2n3 - 89) for even n. This probability approaches 1/9 as n→ ∞. We also show that the probability every person is matched in equilibrium is 0 for odd n and 3n/2-12n-1 for even n.
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