The Communication Complexity of Combinatorial Auctions with Additional Succinct Bidders

Abstract

We study the communication complexity of welfare maximization in combinatorial auctions with bidders from either a standard valuation class (which require exponential communication to explicitly state, such as subadditive or XOS), or arbitrary succinct valuations (which can be fully described in polynomial communication, such as single-minded). Although succinct valuations can be efficiently communicated, we show that additional succinct bidders have a nontrivial impact on communication complexity of classical combinatorial auctions. Specifically, let n be the number of subadditive/XOS bidders. We show that for SA SC (the union of subadditive and succinct valuations): (1) There is a polynomial communication 3-approximation algorithm; (2) As n ∞, there is a matching 3-hardness of approximation, which (a) is larger than the optimal approximation ratio of 2 for SA, and (b) holds even for SA SM (the union of subadditive and single-minded valuations); and (3) For all n ≥ 3, there is a constant separation between the optimal approximation ratios for SA SM and SA (and therefore between SA SC and SA as well). Similarly, we show that for XOS SC: (1) There is a polynomial communication 2-approximation algorithm; (2) As n ∞, there is a matching 2-hardness of approximation, which (a) is larger than the optimal approximation ratio of e/(e-1) for XOS, and (b) holds even for XOS SM; and (3) For all n ≥ 2, there is a constant separation between the optimal approximation ratios for XOS SM and XOS (and therefore between XOS SC and XOS as well).

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