The Banzhaf power index, named after John Banzhaf (originally invented by

Lionel Penrose Lionel Sharples Penrose, FRS (11 June 1898 – 12 May 1972) was an English psychiatrist, medical geneticist, paediatrician, mathematician and chess theorist, who carried out pioneering work on the genetics Genetics is the study of ...

in 1946 and sometimes called Penrose–Banzhaf index; also known as the Banzhaf–Coleman index after James Samuel Coleman), is a power index defined by the

probability Probability is a branch of mathematics and statistics concerning events and numerical descriptions of how likely they are to occur. The probability of an event is a number between 0 and 1; the larger the probability, the more likely an e ...

of changing an outcome of a

vote Voting is the process of choosing officials or policies by casting a ballot, a document used by people to formally express their preferences. Republics and representative democracies are governments where the population chooses representative ...

where voting rights are not necessarily equally divided among the voters or

shareholder A shareholder (in the United States often referred to as stockholder) of corporate stock refers to an individual or legal entity (such as another corporation, a body politic, a trust or partnership) that is registered by the corporation as the ...

s. To calculate the power of a voter using the Banzhaf index, list all the winning coalitions, then count the critical voters. A ''critical voter'' is a voter who, if he changed his vote from yes to no, would cause the measure to fail. A voter's power is measured as the fraction of all swing votes that he could cast. There are some algorithms for calculating the power index, e.g., dynamic programming techniques, enumeration methods and

Monte Carlo method Monte Carlo methods, or Monte Carlo experiments, are a broad class of computational algorithms that rely on repeated random sampling to obtain numerical results. The underlying concept is to use randomness to solve problems that might be ...

Examples

Voting game

Simple voting game

A simple voting game, taken from ''Game Theory and Strategy'' by Philip D. Straffin: ; 4, 3, 2, 1 The numbers in the brackets mean a measure requires 6 votes to pass, and voter A can cast four votes, B three votes, C two, and D one. The winning groups, with underlined swing voters, are as follows: AB, AC, ABC, ABD, ACD, BCD, ABCD There are 12 total swing votes, so by the Banzhaf index, power is divided thus: A = 5/12, B = 3/12, C = 3/12, D = 1/12

U.S. Electoral College

Consider the

United States Electoral College In the United States, the Electoral College is the group of presidential electors that is formed every four years for the sole purpose of voting for the President of the United States, president and Vice President of the United States, vice p ...

. Each state has different levels of voting power. There are a total of 538 electoral votes. A

majority vote A majority is more than half of a total; however, the term is commonly used with other meanings, as explained in the "#Related terms, Related terms" section below. It is a subset of a Set (mathematics), set consisting of more than half of the se ...

is 270 votes. The Banzhaf power index would be a mathematical representation of how likely a single state would be able to swing the vote. A state such as

California California () is a U.S. state, state in the Western United States that lies on the West Coast of the United States, Pacific Coast. It borders Oregon to the north, Nevada and Arizona to the east, and shares Mexico–United States border, an ...

, which is allocated 55 electoral votes, would be more likely to swing the vote than a state such as

Montana Montana ( ) is a landlocked U.S. state, state in the Mountain states, Mountain West subregion of the Western United States. It is bordered by Idaho to the west, North Dakota to the east, South Dakota to the southeast, Wyoming to the south, an ...

, which has 3 electoral votes. Assume the United States is having a presidential election between a Republican (R) and a Democrat (D). For simplicity, suppose that only three states are participating: California (55 electoral votes),

Texas Texas ( , ; or ) is the most populous U.S. state, state in the South Central United States, South Central region of the United States. It borders Louisiana to the east, Arkansas to the northeast, Oklahoma to the north, New Mexico to the we ...

(38 electoral votes), and New York (29 electoral votes). The possible outcomes of the election are: The Banzhaf power index of a state is the proportion of the possible outcomes in which that state could swing the election. In this example, all three states have the same index: 4/12 or 1/3. However, if New York is replaced by Georgia, with only 16 electoral votes, the situation changes dramatically. In this example, the Banzhaf index gives California 1 and the other states 0, since California alone has more than half the votes.

History

What is known today as the Banzhaf power index was originally introduced by

in 1946 and went largely forgotten. It was reinvented by John F. Banzhaf III in 1965, but it had to be reinvented once more by James Samuel Coleman in 1971 before it became part of the mainstream literature. Banzhaf wanted to prove objectively that the Nassau County board's voting system was unfair. As given in ''Game Theory and Strategy'', votes were allocated as follows: * Hempstead #1: 9 * Hempstead #2: 9 * North Hempstead: 7 * Oyster Bay: 3 * Glen Cove: 1 * Long Beach: 1 This is 30 total votes, and a simple majority of 16 votes was required for a measure to pass. In Banzhaf's notation, empstead #1, Hempstead #2, North Hempstead, Oyster Bay, Glen Cove, Long Beachare A-F in 6; 9, 9, 7, 3, 1, 1 There are 32 winning coalitions, and 48 swing votes: AB AC BC ABC ABD ABE ABF ACD ACE ACF BCD BCE BCF ABCD ABCE ABCF ABDE ABDF ABEF ACDE ACDF ACEF BCDE BCDF BCEF ABCDE ABCDF ABCEF ABDEF ACDEF BCDEF ABCDEF The Banzhaf index gives these values: * Hempstead #1 = 16/48 * Hempstead #2 = 16/48 * North Hempstead = 16/48 * Oyster Bay = 0/48 * Glen Cove = 0/48 * Long Beach = 0/48 Banzhaf argued that a voting arrangement that gives 0% of the power to 16% of the population is unfair. Today, the Banzhaf power index is an accepted way to measure voting power, along with the alternative Shapley–Shubik power index. Both measures have been applied to the analysis of voting in the

Council of the European Union The Council of the European Union, often referred to in the treaties and other official documents simply as the Council, and less formally known as the Council of Ministers, is the third of the seven institutions of the European Union (EU) a ...

. However, Banzhaf's analysis has been critiqued as treating votes like coin-flips, and an empirical model of voting rather than a random voting model as used by Banzhaf brings different results.

Notes

References

Footnotes

Bibliography

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External links

Online Power Index Calculator
(by Tomomi Matsui)
Banzhaf Power Index
Includes power index estimates for the 1990s U.S. Electoral College.
Voting Power
Perl calculator for the Penrose index. {{Use Oxford spelling, date=August 2017 Cooperative games Game theory Political science theories Voting theory de:Machtindex#Banzhaf-Index