Approximation Algorithms for the Max-Buying Problem with Limited Supply

Abstract

We consider the Max-Buying Problem with Limited Supply, in which there are n items, with Ci copies of each item i, and m bidders such that every bidder b has valuation vib for item i. The goal is to find a pricing p and an allocation of items to bidders that maximizes the profit, where every item is allocated to at most Ci bidders, every bidder receives at most one item and if a bidder b receives item i then pi ≤ vib. Briest and Krysta presented a 2-approximation for this problem and Aggarwal et al. presented a 4-approximation for the Price Ladder variant where the pricing must be non-increasing (that is, p1 ≥ p2 ≥ ·s ≥ pn). We present an e/(e-1)-approximation for the Max-Buying Problem with Limited Supply and, for every > 0, a (2+)-approximation for the Price Ladder variant.