Envy-freeness is a criterion of fair division. An envy-free division is a division in which every partner feels that his or her allocated share is at least as good as any other share.
Contents
Definitions
A resource is divided among several partners such that every partner
If the preference of the agents are represented by a value functions
Put another way: we say that agent
A division is called envy-free if no agent envies another agent.
History
The envy-freeness concept was introduced to the problem of fair cake-cutting by George Gamow and Marvin Stern in 1958. In the context of fair cake-cutting, envy-freeness means that each partner believes that their share is at least as large as any other share. In the context of chore division, envy-freeness means that each partner believes their share is at least as small as any other share. The crucial issue is that no partner would wish to swap their share with any other partner.
See:
Later, the envy-freeness concept was introduced to the economics problem of resource allocation by Duncan Foley in 1967. It became the dominant fairness criterion in economics. See, for example:
Envy-freeness was also studied in the context of fair item assignment. See:
Implications between proportionality and envy-freeness
Proportionality (PR) and envy-freeness (EF) are two independent properties, but in some cases one of them may imply the other.
When all valuations are additive set functions and the entire cake is divided, the following implications hold:
When the valuations are only subadditive, EF still implies PR, but PR no longer implies EF even with two partners: it is possible that Alice's share is worth 1/2 in her eyes, but Bob's share is worth even more. On the contrary, when the valuations are only superadditive, PR still implies EF with two partners, but EF no longer implies PR even with two partners: it is possible that Alice's share is worth 1/4 in her eyes, but Bob's is worth even less. Similarly, when not all cake is divided, EF no longer implies PR. The implications are summarized in the following table: