TY - JOUR
T1 - Signaling schemes for revenue maximization
AU - Emek, Yuval
AU - Feldman, Michal
AU - Gamzu, Iftah
AU - Paes Leme, Renato
AU - Tennenholtz, Moshe
N1 - Publisher Copyright:
© 2014 held by the Owner/Author.
PY - 2014/6
Y1 - 2014/6
N2 - Signaling is an important topic in the study of asymmetric information in economic settings. In particular, the transparency of information available to a seller in an auction setting is a question of major interest. We introduce the study of signaling when conducting a second price auction of a probabilistic good whose actual instantiation is known to the auctioneer but not to the bidders. This framework can be used to model impressions selling in display advertising. We establish several results within this framework. First, we study the problem of computing a signaling scheme that maximizes the auctioneer's revenue in a Bayesian setting. We show that this problem is polynomially solvable for some interesting special cases, but computationally hard in general. Second, we establish a tight bound on the minimum number of signals required to implement an optimal signaling scheme. Finally, we show that at least half of the maximum social welfare can be preserved within such a scheme.
AB - Signaling is an important topic in the study of asymmetric information in economic settings. In particular, the transparency of information available to a seller in an auction setting is a question of major interest. We introduce the study of signaling when conducting a second price auction of a probabilistic good whose actual instantiation is known to the auctioneer but not to the bidders. This framework can be used to model impressions selling in display advertising. We establish several results within this framework. First, we study the problem of computing a signaling scheme that maximizes the auctioneer's revenue in a Bayesian setting. We show that this problem is polynomially solvable for some interesting special cases, but computationally hard in general. Second, we establish a tight bound on the minimum number of signals required to implement an optimal signaling scheme. Finally, we show that at least half of the maximum social welfare can be preserved within such a scheme.
KW - Algorithms
KW - Asymmetric information
KW - Economics
KW - F.2.2 [analysis of algorithms and problem complexity]: nonnumerical algorithms and problems - complexity of proof procedures
KW - J.4 [social and behavioral sciences]: economics
KW - Probabilistic auctions
KW - Signaling
UR - http://www.scopus.com/inward/record.url?scp=85013008116&partnerID=8YFLogxK
U2 - 10.1145/2594564
DO - 10.1145/2594564
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AN - SCOPUS:85013008116
SN - 2167-8375
VL - 2
JO - ACM Transactions on Economics and Computation
JF - ACM Transactions on Economics and Computation
IS - 2
M1 - 5
ER -