mathematic Mathematics is an area of knowledge that includes the topics of numbers, formulas and related structures, shapes and the spaces in which they are contained, and quantities and their changes. These topics are represented in modern mathematics ...

s and

political science Political science is the scientific study of politics. It is a social science dealing with systems of governance and power, and the analysis of political activities, political thought, political behavior, and associated constitutions and la ...

, the quota rule describes a desired property of a proportional

apportionment The legal term apportionment (french: apportionement; Mediaeval Latin: , derived from la, portio, share), also called delimitation, is in general the distribution or allotment of proper shares, though may have different meanings in different c ...

election An election is a formal group decision-making process by which a population chooses an individual or multiple individuals to hold public office. Elections have been the usual mechanism by which modern representative democracy has opera ...

method. It states that the number of seats that should be allocated to a given party should be between the upper or lower roundings (called upper and lower quotas) of its fractional proportional share (called natural quota).Michael J. Caulfield
"Apportioning Representatives in the United States Congress - The Quota Rule"
MAA Publications. Retrieved October 22, 2018 As an example, if a party deserves 10.56 seats out of 15, the quota rule states that when the seats are allotted, the party may get 10 or 11 seats, but not lower or higher. Many common election methods, such as all

highest averages method A highest-averages method, also called a divisor method, is a class of methods for allocating seats in a parliament among agents such as political parties or federal states. A divisor method is an iterative method: at each iteration, the number ...

s, violate the quota rule.

Mathematics

P

is the population of the party,

T

is the total population, and

S

is the number of available seats, then the natural quota for that party (the number of seats the party would ideally get) is :

\frac P T \cdot S

The lower quota is then the natural quota rounded down to the nearest

integer An integer is the number zero (), a positive natural number (, , , etc.) or a negative integer with a minus sign (−1, −2, −3, etc.). The negative numbers are the additive inverses of the corresponding positive numbers. In the language ...

while the upper quota is the natural quota rounded up. The quota rule states that the only two allocations that a party can receive should be either the lower or upper quota. If at any time an allocation gives a party a greater or lesser number of seats than the upper or lower quota, that allocation (and by extension, the method used to allocate it) is said to be in violation of the quota rule. Another way to state this is to say that a given method only satisfies the quota rule if each party's allocation differs from its natural quota by less than one, where each party's allocation is an integer value.

Example

If there are 5 available seats in the council of a club with 300 members, and party ''A'' has 106 members, then the natural quota for party ''A'' is

\frac   \cdot 5 \approx 1.8

. The lower quota for party ''A'' is 1, because 1.8 rounded down equal 1. The upper quota, 1.8 rounded up, is 2. Therefore, the quota rule states that the only two allocations allowed for party ''A'' are 1 or 2 seats on the council. If there is a second party, ''B'', that has 137 members, then the quota rule states that party ''B'' gets

\frac   \cdot 5 \approx 2.3

, rounded up and down equals either 2 or 3 seats. Finally, a party ''C'' with the remaining 57 members of the club has a natural quota of

\frac   \cdot 5 \approx 0.95

, which means its allocated seats should be either 0 or 1. In all cases, the method for actually allocating the seats determines whether an allocation violates the quota rule, which in this case would mean giving party ''A'' any seats other than 1 or 2, giving party ''B'' any other than 2 or 3, or giving party ''C'' any other than 0 or 1 seat.

Relation to apportionment paradoxes

The Balinski–Young theorem proved in 1980 that if an apportionment method satisfies the quota rule, it must fail to satisfy some

apportionment paradox An apportionment paradox exists when the rules for apportionment in a political system produce results which are unexpected or seem to violate common sense. To apportion is to divide into parts according to some rule, the rule typically being one ...

. For instance, although

Largest remainder method The largest remainder method (also known as Hare–Niemeyer method, Hamilton method or as Vinton's method) is one way of allocating seats proportionally for representative assemblies with party list voting systems. It contrasts with various h ...

satisfies the quota rule, it violates the

Alabama paradox An apportionment paradox exists when the rules for apportionment in a political system produce results which are unexpected or seem to violate common sense. To apportion is to divide into parts according to some rule, the rule typically being one ...

and the

population paradox State-population monotonicity is a property of apportionment methods, which are methods of allocating seats in a parliament among federal states. The property says that, if the population of a state increases faster than that of other states, the ...

. The theorem itself is broken up into several different proofs that cover a wide number of circumstances.M.L. Balinski and H.P. Young. (1980)
"The Theory of Apportionment"
Retrieved October 23 2018 Specifically, there are two main statements that apply to the quota rule: *Any method that follows the quota rule must fail the population paradox. *Any method that is free of both the Alabama paradox and the population paradox must necessarily fail the quota rule for some circumstances.

Use in apportionment methods

Different methods for allocating seats may or may not satisfy the quota rule. While many methods do violate the quota rule, it is sometimes preferable to violate the rule very rarely than to violate some other apportionment paradox; some sophisticated methods violate the rule so rarely that it has not ever happened in a real apportionment, while some methods that never violate the quota rule violate other paradoxes in much more serious fashions. The

does satisfy the quota rule. The method works by proportioning seats equally until a fractional value is reached; the surplus seats are then given to the party with the largest fractional parts until there are no more surplus seats. Because it is impossible to give more than one surplus seat to a party, every party will always get either its lower or upper quota. The

D'Hondt method The D'Hondt method, also called the Jefferson method or the greatest divisors method, is a method for allocating seats in parliaments among federal states, or in party-list proportional representation systems. It belongs to the class of highest- ...

, also known as the Jefferson method sometimes violates the quota rule by allocating more seats than the upper quota allowed. Since D'Hondt was the first method used for Congressional apportionment in the United States, this violation led to a growing problem where larger states receive more representatives than smaller states, which was not corrected until the

Webster/Sainte-Laguë method The Webster method, also called the Sainte-Laguë method () or the major fractions method, is a method for allocating seats in a parliament among federal states, or among parties in a party-list proportional representation system. The method ...

was implemented in 1842; even though Webster/Sainte-Laguë does violate the quota rule, it happens extremely rarely.Ghidewon Abay Asmerom
Apportionment. Lecture 4.
Retrieved October 23, 2018.

References

{{reflist Apportionment (politics) Electoral system criteria