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Envy-freeness, also known as no-envy, is a criterion for fair division. It says that, when resources are allocated among people with equal rights, each person should receive a share that is, in their eyes, at least as good as the share received by any other agent. In other words, no person should feel envy.


General definitions

Suppose a certain resource is divided among several agents, such that every agent i receives a share X_i. Every agent i has a personal
preference relation The term preference relation is used to refer to orderings that describe human preferences for one thing over an other. * In mathematics, preferences may be modeled as a weak ordering or a semiorder, two different types of binary relation. One speci ...
\succeq_i over different possible shares. The division is called envy-free (EF) if for all i and j: :::X_i \succeq_i X_j Another term for envy-freeness is no-envy (NE). If the preference of the agents are represented by a value functions V_i, then this definition is equivalent to: :::V_i(X_i) \geq V_i(X_j) Put another way: we say that agent i ''envies'' agent j if i prefers the piece of j over his own piece, i.e.: :::X_i \prec_i X_j :::V_i(X_i) < V_i(X_j) A division is called envy-free if no agent envies another agent.


Special cases

The notion of envy-freeness was introduced by George Gamow and Marvin Stern in 1958. They asked whether it is always possible to divide a ''cake'' (a heterogeneous resource) among ''n'' children with different tastes, such that no child envies another one. For ''n''=2 children this can be done by the Divide and choose algorithm, but for ''n''>2 the problem is much harder. See
envy-free cake-cutting An envy-free cake-cutting is a kind of fair cake-cutting. It is a division of a heterogeneous resource ("cake") that satisfies the envy-free criterion, namely, that every partner feels that their allocated share is at least as good as any other sha ...
. In cake-cutting, EF means that each child believes that their share is at least as ''large'' as any other share; in the ''chore division'', EF means that each agent believes their share is at least as ''small'' as any other share (the crucial issue in both cases is that no agent would wish to swap their share with any other agent). See
chore division Chore division is a fair division problem in which the divided resource is undesirable, so that each participant wants to get as little as possible. It is the mirror-image of the fair cake-cutting problem, in which the divided resource is desirable ...
. Envy-freeness was introduced to the economics problem of resource allocation by
Duncan Foley Duncan K. Foley (born June 15, 1942) is an American economist. He is the Leo Model Professor of Economics at the New School for Social Research and an External Professor at the Santa Fe Institute. Previously, he was Associate Professor of Econom ...
in 1967. In this problem, rather than a single heterogeneous resource, there are several homogeneous resources. Envy-freeness by its own is easy to attain by just giving each person 1/''n'' of each resource. The challenge, from an economic perspective, is to combine it with Pareto-efficiency. The challenge was first defined by David Schmeidler and Menahem Yaari. See
Efficient envy-free division Efficiency and fairness are two major goals of welfare economics. Given a set of resources and a set of agents, the goal is to divide the resources among the agents in a way that is both Pareto efficient (PE) and envy-free (EF). The goal was first ...
. When the resources to divide are discrete (indivisible), envy-freeness might be unattainable even when there is one resource and two people. There are various ways to cope with this problem: * Transferring money among the participants in order to compensate those who get the less valuable items. This solution is used, for example, in the
rental harmony Rental harmony is a kind of a fair division problem in which indivisible items and a fixed monetary cost have to be divided simultaneously. The housemates problem and room-assignment-rent-division are alternative names to the same problem. In the t ...
problem, and in envy-free pricing. * Sharing a small number of items. This is done, for example, in the
adjusted winner procedure Adjusted Winner (AW) is a procedure for envy-free item allocation. Given two agents and some goods, it returns a partition of the goods between the two agents with the following properties: # Envy-freeness: Each agent believes that his share of th ...
. * Finding approximately-fair allocations; see envy-free item allocation. *Finding partial envy-free allocations that are as large as possible; see
envy-free matching In economics and social choice theory, an envy-free matching (EFM) is a matching between people to "things", which is envy-free in the sense that no person would like to switch his "thing" with that of another person. This term has been used in se ...
. * Using randomization to find allocations that are envy-free in expectation ("ex-ante"); see
fair random assignment Fair random assignment (also called probabilistic one-sided matching) is a kind of a fair division problem. In an ''assignment problem'' (also called '' house-allocation problem'' or '' one-sided matching''), there ''m'' objects and they have to be ...
.


Variants

Strong envy-freeness requires that each agent strictly prefers his bundle to the other bundles.
Super envy-freeness A super-envy-free division is a kind of a fair division. It is a division of resources among ''n'' partners, in which each partner values his/her share at strictly ''more'' than his/her due share of 1/''n'' of the total value, and simultaneously, v ...
requires that each agent strictly prefers his bundle to 1/''n'' of the total value, and strictly prefers 1/''n'' to each of the other bundles. Clearly, super envy-freeness implies strong envy-freeness which implies envy-freeness.
Group envy-freeness Group envy-freeness (also called: coalition fairness) is a criterion for fair division. A group-envy-free division is a division of a resource among several partners such that every group of partners feel that their allocated share is at least as go ...
(also called coalitional envy-freeness) is a strengthening of the envy-freeness, requiring that every group of participants feel that their allocated share is at least as good as the share of any other group with the same size. A weaker requirement is that each individual agent not envy any coalition of other agents; it is sometimes called strict envy-freeness. Stochastic-dominance envy-freeness (SD-envy-free, also called necessary envy-freeness) is a strengthening of envy-freeness for a setting in which agents report ordinal rankings over items. It requires envy-freeness to hold with respect to all additive valuations that are compatible with the ordinal ranking. In other words, each agent should believe that his/her bundle is at least as good as the bundle of any other agent, according to the responsive set extension of his/her ordinal ranking of the items. An approximate variant of SD-EF, called SD-EF1 (SD-EF up to one item), can be attained by the
round-robin item allocation Round robin is a procedure for fair item allocation. It can be used to allocate several indivisible items among several people, such that the allocation is "almost" envy-free: each agent believes that the bundle he received is at least as good as ...
procedure.
No justified envy In economics and social choice theory, a no-justified-envy matching is a matching in a two-sided market, in which no agent prefers the assignment of another agent and is simultaneously preferred by that assignment. Consider, for example, the task ...
is a weakening of no-envy for two-sided markets, in which both the agents and the "items" have preferences over the opposite side, e.g., the market of matching students to schools. Student A feels ''justified envy'' towards student B, if A prefers the school allocated to B, and at the same time, the school allocated to B prefers A. Ex-ante envy-freeness is a weakening of envy-freeness used in the setting of
fair random assignment Fair random assignment (also called probabilistic one-sided matching) is a kind of a fair division problem. In an ''assignment problem'' (also called '' house-allocation problem'' or '' one-sided matching''), there ''m'' objects and they have to be ...
. In this setting, each agent receives a ''lottery'' over the items; an allocation of lotteries is called ex-ante envy-free if no agent prefers the lottery of another agent, i.e., no agent assigns a higher expected utility to the lottery of another agent. An allocation is called ex-post envy-free if each and every result is envy-free. Obviously, ex-post envy-freeness implies ex-ante envy-freeness, but the opposite might not be true. Local envy-freeness (also called: networked envy-freeness or social envy-freeness) is a weakening of envy-freeness based on a social network. It assumes that people are only aware of the allocations of their neighbors in the network, and thus they can only envy their neighbors. Standard envy-freeness is a special case of social envy-freeness in which the network is the complete graph. Meta envy-freeness requires that agents do not envy each other, not only with respect to the final allocation, but also with respect to their goals in the protocol. See
Symmetric fair cake-cutting Symmetric fair cake-cutting is a variant of the fair cake-cutting problem, in which fairness is applied not only to the final outcome, but also to the assignment of roles in the division procedure. As an example, consider a birthday cake that has ...
.
Envy minimization In computer science and operations research, the envy minimization problem is the problem of allocating discrete items among agents with different valuations over the items, such that the amount of envy is as small as possible. Ideally, from a fair ...
is an optimization problem in which the objective is to minimize the amount of envy (which can be defined in various ways), even in cases in which envy-freeness is impossible. For approximate variants of envy-freeness used when allocating indivisible objects, see envy-free item allocation.


Relations to other fairness criteria


See also

* Inequity aversion *
Fair division experiments Various experiments have been made to evaluate various procedures for fair division, the problem of dividing resources among several people. These include case studies, computerized simulations, and lab experiments. Case studies Allocating ind ...
, studying the relative importance of envy-freeness vs. other fairness criteria. *Envy can promote more equal division in alternating-offer
bargaining In the social sciences, bargaining or haggling is a type of negotiation in which the buyer and seller of a good or service debate the price or nature of a transaction. If the bargaining produces agreement on terms, the transaction takes plac ...
. *More than envy-free.


References

{{reflist Fairness criteria