Utility functions on indivisible goods
Some branches of economics and game theory deal with indivisible goods, discrete items that can be traded only as a whole. For example, in combinatorial auctions there is a finite set of items, and every agent can buy a subset of the items, but an item cannot be divided among two or more agents. It is usually assumed that every agent assigns subjective utility to every subset of the items. This can be represented in one of two ways: A cardinal utility function implies a preference relation: implies and implies . Utility functions can have several properties.
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Additive utilityAggregate functionBudget-additive valuationFair item allocationFractionally-subadditive valuationGross substitutes (indivisible items)Sequential auctionSubadditive set functionSubmodular set functionSubmodular utilitySuperadditive set functionSupermodular functionSupermodular utilityUnit demandUtility functions on divisible goods
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Utility functions on indivisible goods
Some branches of economics and game theory deal with indivisible goods, discrete items that can be traded only as a whole. For example, in combinatorial auctions there is a finite set of items, and every agent can buy a subset of the items, but an item cannot be divided among two or more agents. It is usually assumed that every agent assigns subjective utility to every subset of the items. This can be represented in one of two ways: A cardinal utility function implies a preference relation: implies and implies . Utility functions can have several properties.
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Some branches of economics and ...... s can have several properties.
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Some branches of economics and ...... s can have several properties.
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Utility functions on indivisible goods
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