An efficiency ordering of k-price auctions under complete information
Abstract
We study k-price auctions in a complete information environment and characterize all pure-strategy Nash equilibrium outcomes. In a setting with n agents having ordered valuations, we show that any agent, except those with the lowest k-2 valuations, can win in equilibrium. As a consequence, worst-case welfare increases monotonically as we go from k=2 (second-price auction) to k=n (lowest-price auction), with the first-price auction achieving the highest worst-case welfare.
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