Optimal Multi-Dimensional Mechanisms are not Locally-Implementable

Abstract

We introduce locality: a new property of multi-bidder auctions that formally separates the simplicity of optimal single-dimensional multi-bidder auctions from the complexity of optimal multi-dimensional multi-bidder auctions. Specifically, consider the revenue-optimal, Bayesian Incentive Compatible auction for buyers with valuations drawn from D:=×i Di, where each distribution has support-size n. This auction takes as input a valuation profile v and produces as output an allocation of the items and prices to charge, OptD(v). When each Di is single-dimensional, this mapping is locally-implementable: defining each input vi requires ( n) bits, and OptD(v) can be fully determined using just ( n) bits from each Di. This follows immediately from Myerson's virtual value theory [Mye81]. Our main result establishes that optimal multi-dimensional mechanisms are not locally-implementable: in order to determine the output OptD(v) on one particular input v, one still needs to know (essentially) the entire distribution D. Formally, (n) bits from each Di is necessary: (essentially) enough to fully describe Di, and exponentially more than the ( n) needed to define the input vi. We show that this phenomenon already occurs with just two bidders, even when one bidder is single-dimensional, and when the other bidder is barely multi-dimensional. More specifically, the multi-dimensional bidder is ``inter-dimensional'' from the FedEx setting with just two days [FGKK16]. Our techniques are fairly robust: we additionally establish that optimal mechanisms for single-dimensional buyers with budget constraints are not locally-implementable. This occurs with just two bidders, even when one has no budget constraint, and even when the other's budget is public.