TY - GEN
T1 - Are Gross Substitutes a Substitute for Submodular Valuations
AU - Dobzinski, Shahar
AU - Feige, Uriel
AU - Feldman, Michal
N1 - Publisher Copyright:
© 2021 ACM.
PY - 2021/7/18
Y1 - 2021/7/18
N2 - The class of gross substitutes (GS) set functions plays a central role in Economics and Computer Science. GS belongs to the hierarchy of complement free valuations introduced by Lehmann, Lehmann and Nisan, along with other prominent classes: GS gSS Submodular gSS XOS gSS Subadditive$. The GS class has always been more enigmatic than its counterpart classes, both in its definition and in its relation to the other classes. For example, while it is well understood how closely the Submodular, XOS and Subadditive classes (point-wise) approximate one another, approximability of these classes by GS remained wide open. In particular, the largest gap known between Submodular and GS valuations was some constant ratio smaller than 2. Our main result is the existence of a submodular valuation (one that is also budget additive) that cannot be approximated by GS within a ratio better than $Ømega(łog m/łogłog m), where m is the number of items. En route, we uncover a new symmetrization operation that preserves GS, which may be of independent interest. We show that our main result is tight with respect to budget additive valuations. However, whether GS approximates general submodular valuations within a poly-logarithmic factor remains open, even in the special case of concave of GS valuations (a subclass of Submodular containing budget additive). For concave of Rado valuations (Rado is a significant subclass of GS, containing, e.g., weighted matroid rank functions and OXS), we show approximability by GS within an O(łog2m) factor.
AB - The class of gross substitutes (GS) set functions plays a central role in Economics and Computer Science. GS belongs to the hierarchy of complement free valuations introduced by Lehmann, Lehmann and Nisan, along with other prominent classes: GS gSS Submodular gSS XOS gSS Subadditive$. The GS class has always been more enigmatic than its counterpart classes, both in its definition and in its relation to the other classes. For example, while it is well understood how closely the Submodular, XOS and Subadditive classes (point-wise) approximate one another, approximability of these classes by GS remained wide open. In particular, the largest gap known between Submodular and GS valuations was some constant ratio smaller than 2. Our main result is the existence of a submodular valuation (one that is also budget additive) that cannot be approximated by GS within a ratio better than $Ømega(łog m/łogłog m), where m is the number of items. En route, we uncover a new symmetrization operation that preserves GS, which may be of independent interest. We show that our main result is tight with respect to budget additive valuations. However, whether GS approximates general submodular valuations within a poly-logarithmic factor remains open, even in the special case of concave of GS valuations (a subclass of Submodular containing budget additive). For concave of Rado valuations (Rado is a significant subclass of GS, containing, e.g., weighted matroid rank functions and OXS), we show approximability by GS within an O(łog2m) factor.
KW - gross substitutes
KW - valuation functions
UR - http://www.scopus.com/inward/record.url?scp=85112010094&partnerID=8YFLogxK
U2 - 10.1145/3465456.3467615
DO - 10.1145/3465456.3467615
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AN - SCOPUS:85112010094
T3 - EC 2021 - Proceedings of the 22nd ACM Conference on Economics and Computation
SP - 390
EP - 408
BT - EC 2021 - Proceedings of the 22nd ACM Conference on Economics and Computation
PB - Association for Computing Machinery, Inc
T2 - 22nd ACM Conference on Economics and Computation, EC 2021
Y2 - 18 July 2021 through 23 July 2021
ER -