Highest Average Methods

We use the D’Hondt method to illustrate the calculation of the party margin for highest average methods.Footnote ⁵ For each party, a total of n D’Hondt ratios, $\textit{votes}_{j}/i$ , are calculated. The first seat goes to the party with the biggest D’Hondt ratio, the second to the one with the second biggest D’Hondt ratio and so forth.

The $\textit{party margin}_{i,j}$ captures the necessary change in the number of votes such that party $P_j$ is at the margin of winning exactly i seats. This happens if the ith-highest D’Hondt ratio of party $P_j$ equals the $(n-i+1)$ th-highest D’Hondt ratio of all other $J-1$ parties and, thus, if the ith seat for party $P_j$ is decided by a coin flip. The $(n-i+1)$ th-highest D’Hondt ratio is the one with the order statistic $(n (J-1)-(n-i))$ . Formally, the $\textit{party margin}_{i,j}$ is defined as

$$ \begin{align*} \textit{party margin}_{i,j}&= votes_{j}-i\left(\frac{ votes_{-j}}{\tilde i}\right)_{(n (J-1)-(n-i)).} \end{align*} $$

In our example, the seats are allocated to three parties. Party $P_1$ has D’Hondt ratios of 45.0, 22.5, and 15.0, party $P_2$ ’s ratios are 35, 17.5, and 11.7, and party $P_3$ ’s ratios are 20, 10, and 6.7. The three highest D’Hondt ratios achieve a seat and thus in this case party $P_1$ receives two seats and party $P_2$ one seat.

Let us illustrate the calculation of the party margin for all three potential seats of party $P_2$ . The party’s first seat is close if its highest D’Hondt ratio is equal to the third highest D’Hondt ratio of the other parties $P_1$ and $P_3$ which is 20 for the first seat of $P_3$ . The party could lose 15 votes to secure their first seat ( $i=1$ ) against party $P_3$ . Thus, its party margin is 15 for $i=1$ . If party $P_2$ wanted to win two seats, the second D’Hondt ratio of party $P_2$ would have to be equal to the second-highest D’Hondt ratio of all other parties which is 22.5. To achieve this, party $P_2$ would need 10 additional votes and thus the party margin for $i=2$ is $-10$ . Similarly, if party $P_2$ wanted to achieve all three seats, the third-highest D’Hondt ratio of party $P_2$ would have to be equal to the highest D’Hondt ratio of all other parties which is 45. Thus, the party margin is $-100$ for $i=3$ .

Largest Remainder Methods

PR systems that apply the largest remainder method distribute seats by dividing the total votes of a party by a quota. For example, the Hare–Niemeyer method, which we employ for illustration, uses the division of the total number of party votes by a district’s number of seats as a quota. The division of party votes by the quota results in a party-specific Hare–Niemeyer ratio comprising an integer and a fractional remainder. In a first round of the seat allocation, parties receive a total number of seats equalling their integer. In the second round of the seat allocation, parties obtain at most one of the remaining seats in decreasing order of their remainder. We denote the integer part of the Hare–Niemeyer ratio as $\text {floor}\left (\frac {\textit{votes}_j}{\textit{quota}}\right )$ and the remainder as $\text {mod}\left (\frac {\textit{votes}_j}{\textit{quota}}\right )$ . We follow our notation for the highest average method and denote the total votes of our party of interest as $\textit{votes}_j$ , the votes of other parties as $\textit{votes}_{-j}$ , and the (Hare–Niemeyer) quota as $\frac {\textit{votes}_j+\sum _{-j}\textit{votes}_{-j}}{n}$ .

In what follows, we quantify the vote shortfall for seat i of party $P_j$ . In the first step, our procedure establishes the necessary votes such that party $P_j$ receives $i-1$ seats in the first round of the seat allocation and has the same remainder as another party $P_{-j}$ . In a second step, we use these votes to determine the number of free seats to be distributed in the second round of the seat allocation and the ranking of the other parties’ remainders. We repeat the first two steps for all parties $P_{-j}$ and their possible seats. In the third step, we select the relevant solution from the first step. The relevant solution is the one for which the rank of party $P_{-j}$ ’s remainder equals the number of seats to be distributed in the second round of the seat allocation. Intuitively, the remainder that has the same rank as the number of seats to be distributed in the second round obtains the last seat. In the final step, we calculate the party margin as the difference between the actual number of votes and the necessary number of votes from the solution selected in the third step.

If the following condition holds, the parties $P_j$ and $P_{-j}$ achieve exactly $i-1$ and $\tilde i-1$ seats in the first round of the seat allocation and their remainders are identical:

$$ \begin{align*} \frac{\textit{votes}_{i,\tilde i,j,-j} \times n}{\sum_{-j}\textit{votes}_{-j}+\textit{votes}_{i,\tilde i,j,-j}}-(i-1)&=\frac{\textit{votes}_{-j} \times n}{\sum_{-j}\textit{votes}_{-j}+\textit{votes}_{i,\tilde i,j,-j}}-(\tilde i-1). \end{align*} $$

To get the necessary votes for party $P_j$ for the first step outlined above, we can rewrite this condition as

$$ \begin{align*} \textit{votes}_{i,\tilde i,j,-j}&=\frac{\textit{votes}_{-j}\times n+(i-\tilde i) \sum_{-j}\textit{votes}_{-j}}{n-(i-\tilde i)}, \quad \text{where } 1 \leq \tilde i \leq n-i+1. \end{align*} $$

For the second step, we substitute $\textit{votes}_{i,\tilde i,j,-j}$ for the actual votes of $P_j$ and re-calculate the ratios of the $J-1$ other parties. Because we repeat the first two steps for all parties indexed by $-j$ , we need to introduce a new index $-\tilde j$ with the same values as $-j$ to express these ratios. The ratios are

$$ \begin{align*} \frac{\textit{votes}_{-\tilde j} \times n}{\sum_{-\tilde j}\textit{votes}_{-\tilde j}+\textit{votes}_{i,\tilde i,j,-j}}. \end{align*} $$

Based on these ratios, we determine the number of seats to be distributed in the second round of the seat allocation

$$ \begin{align*} F_{i,\tilde i,j,-j}=n-(i-1)-\sum_{-\tilde j} \text{floor} \left(\frac{\textit{votes}_{-\tilde j} \times n}{\sum_{-\tilde j}\textit{votes}_{-\tilde j}+\textit{votes}_{i,\tilde i,j,-j}}\right) \end{align*} $$

and the ranking of all the remainders

$$ \begin{align*} R_{i,\tilde i,j,-j,-\tilde j}=\text{rank}\left(\text{mod} \left(\frac{\textit{votes}_{-\tilde j} \times n}{\sum_{-\tilde j}\textit{votes}_{-\tilde j}+\textit{votes}_{i,\tilde i,j,-j}}\right)\right). \end{align*} $$

As mentioned above, we repeat the first two steps for all $J-1$ parties and all possible seat differences $i-\tilde i$ . Therefore, we have $(J-1)\times (2n+1)$ possible solutions. In the third step, we select the relevant solution, $\textit{votes}_{i,\tilde i,j,-j}^*$ , which satisfies the following conditions:

$$ \begin{align*} F_{i,\tilde i,j,-j}&= R_{i,\tilde i,j,-j, - \tilde j}, \\ -\tilde j&=-j \text{, and }\\ (i-1) &=\text{floor} \left(\frac{\textit{votes}_{i,\tilde i,j,-j} \times n}{\sum_{-\tilde j}\textit{votes}_{-\tilde j}+\textit{votes}_{i,\tilde i,j,-j}}\right). \end{align*} $$

In the fourth step, we define the party margin as the difference between the actual votes and the necessary votes selected in the third step:

$$ \begin{align*} \textit{party margin}_{i,j}=\textit{votes}_{i,j}-\textit{votes}_{i,\tilde i,j,-j}^*. \end{align*} $$

In our example with three seats and 45, 35, and 20 votes for the parties $P_1$ , $P_2$ , and $P_3$ , the Hare–Niemeyer quota is $33.33$ . The party $P_1$ has a ratio of 1.35, the party $P_2$ of 1.05, and the party $P_3$ of 0.6. Thus, the parties $P_1$ and $P_2$ receive one seat each in the first round of the seat allocation and the remaining seat is distributed to party $P_3$ in the second round based on its largest remainder. Let us demonstrate our procedure to find the party margin for the second seat ( $i=2$ ) of party $P_2$ . In the first step, we calculate the necessary number of votes such that party $P_2$ gets one seat ( $i-1$ ) in the first round, the comparison party, $P_1$ or $P_3$ , gets zero or one seat(s) ( $\tilde i-1,$ where $1 \leq \tilde i \leq 3-2+1$ ) in the first round, and party $P_2$ and the comparison party have the same remainder. For example, for the comparison party $P_3$ and $\tilde i=1$ , the solution is 62.5. If party $P_2$ had 62.5 votes, the new Hare–Niemeyer quota would be 42.5, and the ratios of the three parties would be 1.06, 1.47, and 0.47. In the second step, we determine that one seat would remain to be allocated in the second round of the seat distribution and that the remainder of the relevant comparison party $P_3$ would rank first. In the third step, we select 62.5 as the relevant solution because the number of seats to be distributed in the second round and the rank of comparison party $P_3$ are both equal to one. Finally, we calculate the party margin for the second seat of $P_2$ as $35-62.5=-27.5$ .

Institutional Background

The National Council is the larger chamber of the Swiss parliament. Since 1963, it consists of 200 members, for the earlier years in our sample, its size varied between 187 and 196. The electoral districts are the 26 cantons (25 before 1979) with between 1 and 35 seats. The D’Hondt method and open-list ballots are key elements of the electoral system. Parties can form alliances and suballiances (Section 2.4). We use data from the years 1931–2015. In these years, elections take place every 4 years and National Council members face no term limit.

Data

We collect data on all candidates’ votes, election outcome, name, party, age, and gender and on all parties’ votes and alliances from the Federal Gazette for the early years and from the Swiss Federal Statistical Office for later years. We link observations from the same candidate and canton across election years to construct a panel at the candidate level.Footnote ⁷ Starting with $41,555$ observations (excluding vote totals of unnamed individual candidates in single-member districts), we delete $92$ observations from tacit elections. We remain with $41,463$ observations from 26,629 candidates.

To account for the variation in district magnitude, we divide the vote margin by the number of eligible voters (Cox et al. Reference Cox, Fiva and Smith2020). The data on voters are from the Swiss Federal Statistical Office. The variable relative vote margin is the assignment variable in our RD analysis:

$$ \begin{align*} \textit{relative vote margin}=\frac{\textit{vote margin}}{\textit{eligible voters}}. \end{align*} $$

Figure B.1 in the Supplementary Material depicts the smooth distribution of the assignment variable around the threshold. In contrast to other settings, the assignment variable’s density is not informative about its manipulation. Election manipulation moving one candidate above the threshold necessarily moves another candidate below the threshold as the number of seats is fixed. This symmetry prevents bunching.

Institutional Background

The National Congress is the unicameral parliament of Honduras with 128 members from 18 departments that constitute the electoral districts. There are between 1 and 23 representatives per department. Honduras employs the Hare–Niemeyer method and open-list ballots for the parliamentary elections. Honduran voters can vote for candidates from different parties by marking the respective candidates on a ballot that contains all the candidates from the department. This system is only in place since 2005 (Muñoz-Portillo Reference Muñoz-Portillo2013). However, for 2005, no candidate information is available. Therefore, we use the three elections 2009, 2013, and 2017.

Data

We collect information on candidates’ votes, election outcome, name, and party from the Honduran Tribunal Supremo Electoral. We code candidates’ gender from the pictures on the ballots and their first names. For the elected candidates in 2009 and all candidates in the elections of 2013 and 2017, the data from the Honduran Tribunal Supremo Electoral contain unique candidate identifiers. For the remaining candidates, we use a similar procedure as in Switzerland to construct the candidate-level panel.Footnote ⁸ We have $3,025$ observations from $2,644$ candidates.

Again, we divide the vote margin by the number of eligible voters to accommodate differences in district magnitude. Figure B.2 in the Supplementary Material depicts the density of the assignment variable.