A Note on Selling Optimally Two Uniformly Distributed Goods
Abstract
We provide a new, much simplified and straightforward proof to a result of Pavlov [2011] regarding the revenue maximizing mechanism for selling two goods with uniformly i.i.d. valuations over intervals , to an additive buyer. This is done by explicitly defining optimal dual solutions to a relaxed version of the problem, where the convexity requirement for the bidder's utility has been dropped. Their optimality comes directly from their structure, through the use of exact complementarity. For and it turns out that the corresponding optimal primal solution is a feasible selling mechanism, thus the initial relaxation comes without a loss, and revenue maximality follows. However, for that's not the case, providing the first clear example where relaxing convexity provably does not come for free, even in a two-item regularly i.i.d. setting.
Keywords
Cite
@article{arxiv.1409.6925,
title = {A Note on Selling Optimally Two Uniformly Distributed Goods},
author = {Yiannis Giannakopoulos},
journal= {arXiv preprint arXiv:1409.6925},
year = {2015}
}