Revenue Guarantees of No-Swap-Regret Dynamics in First Price Auctions

Abstract

We study the revenue of approximate correlated equilibrium in discrete first price auctions - the set of allowable bids is B = \0, 1/k, …, 1 - 1/k, 1\ for some k ∈ N. We show that the revenue of any ε-approximate correlated equilibrium is at least v2 - Θ(1/k)- Θ(εk2), where v2 ≥ 0 is the second-highest valuation. Our results establish the first polynomial convergence rates on the revenue generated by no-swap regret bidders in first-price auctions. For instance, if bidders admit the optimal swap regret of O(k T), then the time-averaged revenue is at least v2 - Θ(1/k) - Θ(ε) after O(k5/ε2) rounds.