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Largest remainder method

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(Redirected from Hamilton method)

The largest remainder method is one way of allocating seats proportionally for representative assemblies with party list voting systems. It is a contrast to the highest averages method.

Contents

Method

The largest remainder method requires the number of votes for each party to be divided by a quota representing the number of votes required for a seat, and this gives a notional number of seats to each, usually including an integer and either a vulgar fraction or alternatively a remainder. Each party receives seats equal to the integer. This will generally leave some seats unallocated: the parties are then ranked on the basis of the fraction or equivalently on the basis of the remainder, and parties with the larger fractions or remainders are each allocated one additional seat until all the seats have been allocated. This gives the method its name.

Quotas

There are several possibilities for the quota. The most common are: the Hare quota and the Droop quota.

The Hare Quota is defined as follows

<math>\frac{\mbox{total} \; \mbox{votes}}{\mbox{total} \; \mbox{seats}}<math>

The Hamilton method of apportionment is actually a largest-remainder method which is specifically defined as using the Hare Quota, named after Alexander Hamilton. It is used for legislative elections in Namibia and in the territory of Hong Kong. It was historically applied for congressional apportionment in the United States during the nineteenth century.

The Droop quota is the integer part of

<math>1+\frac{\mbox{total} \; \mbox{votes}}{1+\mbox{total} \; \mbox{seats}}<math>

and is applied in elections in South Africa.

The Hare quota tends to be slightly more generous to less popular parties and the Droop quota to more popular parties. Which is more proportional depends on what measure of proportionality is used.

The Imperiali quota

<math>\frac{\mbox{total} \; \mbox{votes}}{2+\mbox{total} \; \mbox{seats}}<math>

is rarely used since it suffers from the problem that it may result in more candidates being elected than there are seats available; this will certainly happen if there are only two parties. In such a case, it is usual to increase the quota until the number of candidates elected is equal to the number of seats available, in effect changing the voting system to a highest averages system with the Jefferson apportionment formula.

Pros and cons

It is very easy for the average voter to understand how Largest Remainder allocates seats. Provided the Hare quota is used, it gives no advantage to lists with either a large or a small proportion of the votes - to that it extent it is neutral. However, whether a list gets an extra seat or not is highly dependent on how the votes are distributed among other parties; it is quite possible for a party to make a slight percentage gain yet lose a seat. A related paradox is that increasing the number of seats may cause a party to lose a seat. The Sainte-Laguë method avoids these paradoxes but is less easy for the average voter to understand.

Technical evaluation and paradoxes

The largest remainder method is the only apportionment that satisfies the quota rule; in fact, it is designed to satisfy this criterion. However, it comes at the cost of paradoxical behaviour. The Alabama paradox is defined as when an increase in seats apportioned leads to decrease in the number of seats a certain party holds. Suppose we want to apportion 25 seats between 6 parties in the proportions 1500:1500:900:500:500:200. The two parties with 500 votes get three seats each. Now allocate 26 seats, and it will be found that the these parties get only two seats apiece.

With 25 seats, we get:

Party A B C D E F Total
Votes 1500 1500 900 500 500 200 5100
Seats             25
Hare Quota             204
Quotas Received 7.35 7.35 4.41 2.45 2.45 0.98  
Automatic seats 7 7 4 2 2 0 22
Remainder 0.35 0.35 0.41 0.45 0.45 0.98  
Surplus seats 0 0 0 1 1 1 3
Total Seats 7 7 4 3 3 1 25

With 26 seats, we have:

Party A B C D E F Total
Votes 1500 1500 900 500 500 200 5100
Seats             26
Hare Quota             196
Quotas Received 7.65 7.65 4.59 2.55 2.55 1.02  
Automatic seats 7 7 4 2 2 1 23
Remainder 0.65 0.65 0.59 0.55 0.55 0.02  
Surplus seats 1 1 1 0 0 0 3
Total Seats 8 8 5 2 2 1 26

Examples

These examples take an election to allocate 10 seats where there are 100,000 votes.

Hare quota

Party Yellows Whites Reds Greens Blues Pinks Total
Votes 47,000 16,000 15,800 12,000 6,100 3,100 100,000
Seats             10
Hare Quota             10,000
Votes/Quota 4.70 1.60 1.58 1.20 0.61 0.31  
Automatic seats 4 1 1 1 0 0 7
Remainder 0.70 0.60 0.58 0.20 0.61 0.31  
Highest Remainder Seats 1 1 0 0 1 0 3
Total Seats 5 2 1 1 1 0 10

Droop quota

Party Yellows Whites Reds Greens Blues Pinks Total
Votes 47,000 16,000 15,800 12,000 6,100 3,100 100,000
Seats             10
Droop Quota             9,091
Votes/Quota 5.170 1.760 1.738 1.320 0.671 0.341  
Automatic seats 5 1 1 1 0 0 8
Remainder 0.170 0.760 0.738 0.320 0.671 0.341  
Highest Remainder Seats 0 1 1 0 0 0 2
Total Seats 5 2 2 1 0 0 10

See also

External links

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