Egalitarian cake-cutting is a kind of
fair cake-cutting in which the fairness criterion is the
egalitarian rule. The ''cake'' represents a continuous resource (such as land or time), that has to be allocated among people with different valuations over parts of the resource. The goal in egalitarian cake-cutting is to maximize the smallest value of an agent; subject to this, maximize the next-smallest value; and so on. It is also called leximin cake-cutting, since the optimization is done using the
leximin order on the vectors of utilities.
The concept of egalitarian cake-cutting was first described by
Dubins and
Spanier, who called it "optimal partition".
Existence
Leximin-optimal allocations exist whenever the set of allocations is a
compact space. This is always the case when allocating discrete objects, and easy to prove when allocating a finite number of continuous homogeneous resources.
Dubins and Spanier proved that, with a continuous ''heterogeneous'' resource ("
cake
Cake is a flour confection made from flour, sugar, and other ingredients, and is usually baked. In their oldest forms, cakes were modifications of bread, but cakes now cover a wide range of preparations that can be simple or elaborate, ...
"), the set of allocations is compact.
Therefore, leximin-optimal cake allocations always exist. For this reason, the leximin cake-allocation rule is sometimes called the Dubins–Spanier rule.
Variants
When the agents' valuations are not normalized (i.e., different agents may assign a different value to the entire cake), there is a difference between the ''absolute utility profile'' of an allocation (where element ''i'' is just the utility of agent ''i''), and its ''relative utility profile'' (where element ''i'' is the utility of agent ''i'' divided by the total value for agent ''i''). The absolute leximin rule chooses an allocation in which the absolute utility profile is leximin-maximal, and the relative leximin rule chooses an allocation in which the relative utility profile is leximin-maximal.
Properties
Both variants of the leximin rule are Pareto-optimal and
population monotonic Population monotonicity (PM) is a principle of consistency in allocation problems. It says that, when the set of agents participating in the allocation changes, the utility of all agents should change in the same direction. For example, if the resou ...
. However, they differ in other properties:
* The absolute-leximin rule is
resource monotonic
Resource monotonicity (RM; aka aggregate monotonicity) is a principle of fair division. It says that, if there are more resources to share, then all agents should be weakly better off; no agent should lose from the increase in resources. The RM pri ...
but not
proportional
Proportionality, proportion or proportional may refer to:
Mathematics
* Proportionality (mathematics), the property of two variables being in a multiplicative relation to a constant
* Ratio, of one quantity to another, especially of a part compare ...
;
* The relative-leximin rule is proportional but not resource-monotonic.
Relation to envy-freeness
Both variants of the leximin rule may yield allocations that are not
envy-free. For example, suppose there are 5 agents, the cake is piecewise-homogeneous with 3 regions, and the agents' valuations are (missing values are zeros):
All agents value the entire cake at 15, so absolute-leximin and relative-leximin are equivalent. The largest possible minimum value is 5, so a leximin allocation must give all agents at least 5. This means that the Right must be divided equally among agents C, D, E, and the Middle must be given entirely to agent B. But then A envies B.
Dubins and Spanier
proved that, when all value-measures are strictly positive, every relative-leximin allocation is envy-free.
Weller
showed an
envy-free and
efficient cake allocation that is not relative-leximin. The cake is
,1 there are three agents, and their value measures are
trianglular distributions centered at 1/4, 1/2 and 3/4 respectively. The allocation (
,3/8 /8,5/8 /8,1 has utility profile (3/8,7/16,7/16). It is envy-free and
utilitarian-optimal, hence Pareto-efficient. However, there is another allocation (
,5/16 /16,11/16 1/16,1 with a leximin-better utility profile.
Computation
Dall'aglio
presents an algorithm for computing a leximin-optimal resource allocation.
See also
*
Equitable cake-cutting Equitable (EQ) cake-cutting is a kind of a fair cake-cutting problem, in which the fairness criterion is equitability. It is a cake-allocation in which the subjective value of all partners is the same, i.e., each partner is equally happy with his/he ...
- an allocation giving each agent an equal utility. Often, the egalitarian allocation coincides with the equitable allocation, since if the utilities are different, the smaller utility can be improved by moving some cake from the agent with larger utility.
*
Egalitarian equivalence Egalitarian equivalence (EE) is a criterion of fair division.
In an egalitarian-equivalent division, there exists a certain "reference bundle" Z such that each agent feels that his/her share is equivalent to Z.
The EE fairness principle is usually ...
- a similar concept in the context of homogeneous resource allocation.
References
{{Reflist
Egalitarianism
Cake-cutting