The envy-free pricing problem can be stated as finding a pricing and allocation scheme in which each consumer is allocated a set of items that maximize her utility under the pricing. The goal is to maximize seller revenue. We study the problem with
constraints which are given as an independence system defined over the items. The constraints, for example, can be a number of linear constraints or matroids. This captures the situation where items do not pre-exist, but are produced in reflection of consumer valuation of the items under the limit of resources.
This paper focuses on the case of unit-demand consumers. In the setting, there are
items; each item may be produced in multiple copies. Each consumer
] has a valuation
in the set
in which she is interested. She must be allocated (if any) an item which gives the maximum (non-negative) utility. Suppose we are given an
for finding the maximum weight independent set for the given independence system (or a slightly stronger oracle); for a large number of natural and interesting supply constraints, constant approximations are available. We obtain the following results.
)-approximation for the general case.
)-approximation when each consumer is interested in at most
distinct types of items.
)-approximation when each item is interesting to at most
Note that the final two results were previously unknown even without the independence system constraint.