Round-robin, paired comparison, or tournament voting methods, are a set of

ranked voting systems Ranked voting is any voting system that uses voters' Ordinal utility, rankings of candidates to choose a single winner or multiple winners. More formally, a ranked vote system depends only on voters' total order, order of preference of the cand ...

that choose winners by comparing every pair of candidates one-on-one, similar to a

round-robin tournament A round-robin tournament or all-play-all tournament is a competition format in which each contestant meets every other participant, usually in turn.''Webster's Third New International Dictionary of the English Language, Unabridged'' (1971, G. & ...

. In each paired matchup, we record the total number of voters who prefer each candidate in a beats matrix. Then, a majority-preferred (Condorcet) candidate is elected, if one exists. Otherwise, if there is a

cyclic tie In social choice theory, Condorcet's voting paradox is a fundamental discovery by the Marquis de Condorcet that majority rule is inherently self-contradictory. The result implies that it is logically impossible for any voting system to guarante ...

, the candidate "closest" to being a Condorcet winner is elected, based on the recorded beats matrix. How "closest" is defined varies by method. Round-robin methods are one of the four major categories of single-winner electoral methods, along with multi-stage methods (like RCV-IRV), positional methods (like

plurality Plurality may refer to: Law and politics * Plurality decision, in a decision by a multi-member court, an opinion held by more judges than any other but not by an overall majority * Plurality (voting), when a candidate or proposition polls more ...

and

Borda The Bremen Overseas Research and Development Association (BORDA) is a non-profit international development organization headquartered in Bremen, Germany. It has regional offices in Afghanistan, India, Indonesia, Mexico, and Tanzania, as well as ...

), and graded methods (like

score SCORE may refer to: *SCORE (software), a music scorewriter program * SCORE (television), a weekend sports service of the defunct Financial News Network *SCORE! Educational Centers *SCORE International, an offroad racing organization *Sarawak Corrido ...

and

STAR voting STAR voting is an electoral system for single-seat elections. The name (an allusion to Star (classification), star ratings) stands for "Score Then Automatic Runoff", referring to the fact that this system is a combination of score voting, to pi ...

). Most, but not all, election methods meeting the

Condorcet criterion A Condorcet winner (, ) is a candidate who would receive the support of more than half of the electorate in a one-on-one race against any one of their opponents. Voting systems where a majority winner will always win are said to satisfy the Condo ...

are based on pairwise counting.

Summary

In paired voting, each voter ranks candidates from first to last (or

rates Rate or rates may refer to: Finance * Rate (company), an American residential mortgage company formerly known as Guaranteed Rate * Rates (tax), a type of taxation system in the United Kingdom used to fund local government * Exchange rate, rate ...

them on a scale). For each pair of candidates (as in a

), we count how many votes rank each candidate over the other.

Pairwise counting

Pairwise counts are often displayed in a ''pairwise comparison'' or ''outranking matrix'' such as those below. In these

matrices Matrix (: matrices or matrixes) or MATRIX may refer to: Science and mathematics * Matrix (mathematics), a rectangular array of numbers, symbols or expressions * Matrix (logic), part of a formula in prenex normal form * Matrix (biology), the ...

, each row represents each candidate as a 'runner', while each column represents each candidate as an 'opponent'. The cells at the intersection of rows and columns each show the result of a particular pairwise comparison. Cells comparing a candidate to themselves are left blank. Imagine there is an election between four candidates: , , and . The first matrix below records the preferences expressed on a single ballot paper, in which the voter's preferences are ; that is, the voter ranked first, second, third, and fourth. In the matrix a '1' indicates that the runner is preferred over the opponent, while a '0' indicates that the opponent is preferred over the runner. In this matrix the number in each cell indicates either the number of votes for runner over opponent (runner,opponent) or the number of votes for opponent over runner (opponent, runner). If pairwise counting is used in an election that has three candidates named , , and , the following pairwise counts are produced: * vs. * vs. * vs. If the number of voters who have no preference between two candidates is not supplied, it can be calculated using the supplied numbers. Specifically, start with the total number of voters in the election, then subtract the number of voters who prefer the first over the second, and then subtract the number of voters who prefer the second over the first. The ''pairwise comparison matrix'' for these comparisons is shown below. A candidate cannot be pairwise compared to itself (for example candidate can't be compared to candidate ), so the cell that indicates this comparison is either empty or contains a 0. Each ballot can be transformed into this style of matrix, and then added to all other ballot matrices using

matrix addition In mathematics, matrix addition is the operation of adding two matrices by adding the corresponding entries together. For a vector, \vec\!, adding two matrices would have the geometric effect of applying each matrix transformation separately ...

. The resulting sum of all ballots in an election is called the sum matrix, and it summarizes all the voter preferences. An election counting method can use the sum matrix to identify the winner of the election. Suppose that this imaginary election has two additional voters, and their preferences are and . Added to the first voter, these ballots yield the following sum matrix: In the sum matrix above, is the Condorcet winner, because they beat every other candidate one-on-one. When there is no Condorcet winner, ranked-robin methods such as ranked pairs use the information contained in the sum matrix to choose a winner. The first matrix above, which represents a single ballot, is inversely symmetric: (runner,opponent) is ¬(opponent,runner). Or (runner,opponent) + (opponent,runner) = 1. The sum matrix has this property: (runner, opponent) + (opponent, runner) = for voters, if all runners are fully ranked by each voter.

Number of pairwise comparisons

For candidates, there are pairwise matchups, assuming it is necessary to keep track of tied ranks. When working with margins, only half of these are necessary because storing both candidates' percentages becomes redundant. For example, for 3 candidates there are 6 pairwise comparisons (and 3 pairwise margins), for 4 candidates there are 12 pairwise comparisons, and for 5 candidates there are 20 pairwise comparisons.

Example

These ranked preferences indicate which candidates the voter prefers. For example, the voters in the first column prefer Memphis as their 1st choice, Nashville as their 2nd choice, etc. As these ballot preferences are converted into pairwise counts they can be entered into a table. The following square-grid table displays the candidates in the same order in which they appear above. The following tally table shows another table arrangement with the same numbers.

References

{{Voting systems Single-winner electoral systems Preferential electoral systems