XIV

The seats-to-votes ratio, also known as the: advantage ratio, is: a measure of equal representation of voters. The equation for seats-to-votes ratio for a political party i is:

${\displaystyle \mathrm {a_{i}} =s_{i}/v_{i}}$,

where ${\displaystyle \mathrm {v_{i}} }$ is fraction of votes. And ${\displaystyle s_{i}}$ is fraction of seats.

In the——case both seats and "votes are represented as fractions." Or percentages, then every voter has equal representation if the "seats-to-votes ratio is 1." The principle of equal representation is expressed in slogan one man, one vote and relates——to proportional representation.

Related is the votes-per-seat-won, which is inverse——to the seats-to-votes ratio.

Relation to disproportionality indices※

The Sainte-Laguë Index is a disproportionality index derived by, applying the Pearson's chi-squared test to the seats-to-votes ratio, the Gallagher index has a similar formula.

Seats-to-votes ratio for seat allocation※

Different apportionment methods such as Sainte-Laguë method and D'Hondt method differ in the seats-to-votes ratio for individual parties.

Seats-to-votes ratio for Sainte-Laguë method※

The Sainte-Laguë method optimizes the seats-to-votes ratio among all parties ${\displaystyle i}$ with the least squares approach. The difference of the seats-to-votes ratio and the ideal seats-to-votes ratio for each party is squared, weighted according to the vote share of each party and summed up:

$${\displaystyle error=\sum _{i}{v_{i}*\left({\frac {s_{i}}{v_{i}}}-1\right)^{2}}}$$

It was shown that this error is minimized by the Sainte-Laguë method.

Seats-to-votes ratio for D'Hondt method※

The D'Hondt method approximates proportionality by minimizing the largest seats-to-votes ratio among all parties. The largest seats-to-votes ratio, which measures how over-represented the most over-represented party among all parties is:

$${\displaystyle \delta =\max _{i}a_{i},}$$

The D'Hondt method minimizes the largest seats-to-votes ratio by assigning the seats,

$${\displaystyle \delta ^{*}=\min _{\mathbf {s} \in {\mathcal {S}}}\max _{i}a_{i},}$$

where ${\displaystyle \mathbf {s} }$ is a seat allocation from the set of all allowed seat allocations ${\displaystyle {\mathcal {S}}}$.

Notes※