Fractionally subadditive valuation
A set function is called fractionally subadditive, or XOS, if it is the maximum of several non-negative additive set functions.
This valuation class was defined, and termed XOS, by Noam Nisan, in the context of combinatorial auctions. The term fractionally subadditive was given by Uriel Feige.
Definition
There is a finite base set of items,.There is a function which assigns a number to each subset of.
The function is called fractionally subadditive if there exists a collection of set functions,, such that:
- Each is additive, i.e., it assigns to each subset, the sum of the values of the items in.
- The function is the pointwise maximum of the functions. I.e, for every subset :
Equivalent Definition
Relation to other utility functions
Every submodular set function is XOS, and every XOS function is a subadditive set function.See also: Utility functions on indivisible goods.
Etymology
The term XOS stands for XOR-of-ORs of Singleton valuations.A Singleton valuation is a valuation function such that there exists a value and item such that if and only if, and otherwise. That is, a Singleton valuation has value for receiving item and has no value for any other items.
An OR of valuations interprets each as representing a distinct player. The OR of is a valuation function such that. That is, the OR of valuations is the optimal welfare that can be achieved by partitioning among players with valuations. The term "OR" refers to the fact that any of the players can receive items. Observe that an OR of Singleton valuations is an additive function.
An XOR of valuations is a valuation function such that. The term "XOR" refers to the fact that exactly one of the players can receive items. Observe that an XOR of additive functions is XOS.