Optimal Multi-Unit Mechanisms with Private Demands
Abstract
In the multi-unit pricing problem, multiple units of a single item are for sale. A buyer's valuation for units of the item is , where the per unit valuation and the capacity are private information of the buyer. We consider this problem in the Bayesian setting, where the pair is drawn jointly from a given probability distribution. In the \emph{unlimited supply} setting, the optimal (revenue maximizing) mechanism is a pricing problem, i.e., it is a menu of lotteries. In this paper we show that under a natural regularity condition on the probability distributions, which we call \emph{decreasing marginal revenue}, the optimal pricing is in fact \emph{deterministic}. It is a price curve, offering units of the item for a price of , for every integer . Further, we show that the revenue as a function of the prices is a \emph{concave} function, which implies that the optimum price curve can be found in polynomial time. This gives a rare example of a natural multi-parameter setting where we can show such a clean characterization of the optimal mechanism. We also give a more detailed characterization of the optimal prices for the case where there are only two possible demands.
Cite
@article{arxiv.1704.05027,
title = {Optimal Multi-Unit Mechanisms with Private Demands},
author = {Nikhil R. Devanur and Nima Haghpanah and Christos-Alexandros Psomas},
journal= {arXiv preprint arXiv:1704.05027},
year = {2017}
}