3.1 The Unilateral Redistricting Process

We consider two methods of drawing district maps. First, one party has unilateral control of the process. Given a set of potential valid maps $\mathcal {M}$ , when party i draws the maps, it will select a map $\widetilde {M_i}\in \mathcal {M}$ that maximizes $U_i$ .Footnote ⁴ Under this method of redistricting, party i will maximize partisan advantage relative to party j by strategically cracking and packing party j’s voters to minimize the seats won by party j. In many cases, party i will win a substantially larger share of the seats than its statewide vote share, sometimes even translating a minority of statewide votes into a majority of legislative seats.

This method, which we call the “unilateral redistricting process” (URP), approximates the redistricting process in states where one party controls redistricting. While other factors, such as incumbency or vote margins in close seats, factor into districting decisions, gerrymandering for partisan gain is a primary objective for the party in power. When independent experts have used map-drawing software to simulate thousands of possible maps in a state, the observed maps in states with unilateral redistricting appear to be among the most partisan possible.Footnote ⁵

3.2 The Define–Combine Procedure

The second method we consider is our own innovation, the two-stage DCP. In this model, the power to draw the map is divided between the two parties, but in each stage of the process, one party acts unilaterally.

Suppose Party A acts in the first stage as the “Definer,” and Party B acts in the second stage as the “Combiner.” The game proceeds as follows:

1. 1. Party A defines a set of $2N$ contiguous, equally populated districts. To avoid confusion with the following stage, we refer to these districts as subdistricts.

2. 2. Party B creates the final map of N districts by combining pairs of contiguous subdistricts.

Party A moves first and has a strategy profile consisting of a selection of a map $M_A \in \mathcal {M}$ , the set of all maps with $2N$ valid districts.Footnote ⁶ Party B combines subdistricts to create a map $M_B \in Q(M_A)$ , where $Q(M_A)$ is the set of valid groupings of the subdistricts in $M_A$ .

Party B, the second mover, will select a best response to any proposed set of subdistricts. The strategy $\sigma _B$ is a mapping from the set of valid groupings of subdistricts to a single map, $\widehat {M}_B$ , such that

$$ \begin{align*}\widehat{M}_B \equiv \sigma_B (M_A) \in \text{argmax } U_B(Q(M_A)). \end{align*} $$

Because voters themselves are indivisible and the districts in this setup consist of sets of voters, any game has a fixed number of possible districts. Also, the second mover knows what the first mover has chosen to do. In a finite extensive game with perfect information, such as DCP, there exists a subgame perfect equilibrium solvable using backward induction (Osborne Reference Osborne2004, 173). For the map $M_A$ selected by Party A, Party B will examine feasible maps, $Q(M_A)$ and will select the map $\widehat {M}_B \in Q(M_A)$ maximizing the percentage of seats won by Party B. For every possible map $M_A \in \mathcal {M}$ , Party A can anticipate what map $M_B$ Party B would ultimately draw. Therefore, it selects the map $\widehat {M}_A$ maximizing the percentage of seats won by Party A subject to Party B’s best-response pairings, with payoff $ U_A(\sigma _B (\widehat {M}_A))$ .

3.3 A Simple Example: Iowa

A simple example illustrates the DCP framework. Consider a (simplified) map of Iowa, as shown in Figure 1, with 30 equally populated precincts and an overall statewide vote share of 50% for the Democrats and 50% for the Republicans.Footnote ⁷

Figure 1 Simplified Iowa map. This figure displays a simplified map of Iowa with the state split into 30 equally populated precincts.

Suppose redistricting requires that the state must be divided into five equally populated contiguous districts. Given that each of the 30 precincts has the same population, the state must be divided into five districts of six precincts each. Under these assumptions, there are 27,250 possible maps.

If Democrats redraw the map unilaterally and maximize the number of seats won, they can construct a map where they win four seats and Republicans win one seat. Figure 2a shows one such map (out of many equivalent possibilities) drawn by the Democrats unilaterally. Districts won by Democrats (Republicans) are denoted with a blue (red) outline. In this example, Republicans are packed into District 4, and Democrats win majorities in Districts 1–3 and 5. Conversely, as illustrated in Figure 2b, when Republicans act unilaterally, the opposite result is possible; Republicans win four seats, and Democrats win one.

Figure 2 Examples of final maps for Iowa under URP and under DCP. This figure displays example maps that could emerge from an illustrative Define–Combine Procedure applied to a simplified map of Iowa.

We now apply DCP to this simple example. In the first stage, the defining party will draw a map consisting of 10 contiguous subdistricts, each with three precincts. There are 7,713 valid divisions of this map of Iowa. In the second stage, the combining party selects contiguous pairs of subdistricts to create the final district map. The number of possible combinations in the second stage varies based on the subdistricts defined in the first stage. In this example, the number of combinations varies from 2 to 20 possibilities.

For any possible proposed map, the defining party analyzes the resulting combinations and determines the best response for the combining party. The defining party chooses the map that minimizes the combining party’s utility from the optimal pairing in the subgame. Given the distribution of voters in our running example, Figure 2 presents the results of DCP for this simple example if the Democrats go first, in panel (c), and if the Republicans go first, in panel (d). Multiple equilibria exist, and we present just one graphically. The defined subdistrict plan selected by the Democrats results in three seats for Democrats and two seats for Republicans. The Republicans cannot choose any other combination of these subdistricts to improve the outcome. Similarly, if the Republicans move first, then in equilibrium the Republicans win three seats and the Democrats win two seats. Thus, DCP reduces the advantage conferred to the map drawer. Under URP, there is a three-seat (of five total seats) difference in partisan outcomes depending on who controls the process, while under DCP there is only a one-seat difference depending on who draws the define-stage map. We denote this difference based on first-mover status as $\delta $ : for URP, $\delta = 0.8 - 0.2 = 0.6$ , and for DCP, $\delta = 0.6 - 0.4 = 0.2$ .

4.1 Simulated State Congressional Maps

We use map-drawing algorithms to simulate and compare both redistricting procedures. Unlike other studies of gerrymandering using simulation methods, we focus not on the distribution of possible outcomes in each state but rather on the limit—the most extreme possible map drawn by each party using each process. To identify these maps, we employ the “shortburst” algorithm (Cannon et al. Reference Cannon, Goldbloom-Helzner, Gupta, Matthews and Suwal2023), which begins with a starting map and assigns it a numerical score, such as the number of seats won by a given party. Shortburst maximizes (or minimizes) any objective function defined over a geographic space, and we apply it specifically to the problem of extreme gerrymandering. The algorithm generates a set of N variations of the starting map in a “burst,” calculates a score for each using the same scoring function, and selects the map with the highest score. This burst process repeats until the score stabilizes. As Cannon et al. (Reference Cannon, Goldbloom-Helzner, Gupta, Matthews and Suwal2023) shows, this approach finds more extreme outcomes than those identified by random walks and other distributional approaches.

While the shortburst algorithm is not guaranteed to find the most extreme gerrymander possible in a state, this approach often finds the most extreme known gerrymanders and in many cases achieves gerrymanders that would secure a party’s total victory (e.g., winning all seats in a state). Furthermore, the implementation of shortburst that we apply employs sequential Monte Carlo methods (McCartan and Imai Reference McCartan and Imai2023) designed to explore the space of feasible redistricting plans better than previous Markov chain Monte Carlo methods. These efforts are important because the number of maps in real-world redistricting is large enough to make exhaustive searches of all maps computationally infeasible (see Appendix I of the Supplementary Material for a full discussion and calculations estimating the number of possible maps at each stage).

We first apply shortburst directly to maximize seats won for each party in order to solve for the real-world URP maps that a seat-maximizing redistricter would draw in each state. Second, we develop a custom two-stage algorithm to identify the maps resulting from DCP in each state. Appendix C of the Supplementary Material provides the full details of how we implement these simulations, including pseudocode of the algorithm. We offer condensed descriptions here.

To simulate maps drawn under unilateral redistricting (e.g., maximizing seats won for each party), we apply shortburst for each state and party, running 10 separate sets of simulations. We (1) generate a random starting map, (2) run the shortburst algorithm 2,000 times, generating 10 maps per burst, and (3) save the final map. The scoring function maximizes first the number of seats won by the party and second the party’s vote share in the next closest district.Footnote ⁸

To simulate DCP, we implement a “nested shortburst” algorithm. For each state and party, we run 20 separate sets of simulations. We (1) generate a random starting map of $2N$ districts and (2) run the shortburst algorithm 100 times, with 20 maps generated per burst. However, we score each map using a second iteration of the shortburst algorithm, which finds the pairing of districts that maximizes seats for the second party.Footnote ⁹ This two-step approach directly incorporates both parties’ strategic behavior—maximizing their own seat advantage—at each stage of the game rather than just observing a random set of proposals from the second stage and then choosing the best option. Nonetheless, because the set of possible maps at each stage is large,Footnote ¹⁰ we also subsequently validate our key results describing equilibrium behaviors for DCP and URP with an analytical model (see Appendix B of the Supplementary Material) and with grid maps for which we can enumerate all district combinations (see Appendix H.2 of the Supplementary Material).

Using election data from the Voting and Election Science Team (2022) merged with 2020 census data from the ALARM Project (Kenny and McCartan Reference Kenny and McCartan2021), we ran simulations for every state with at least two congressional districts. We measure partisanship using the 2020 presidential election results. For each simulation, we use a 1% population deviation constraint (using 2020 total population),Footnote ¹¹ a simple compactness constraint,Footnote ¹² and require all districts to be contiguous.

We compare the performance of DCP to two key benchmarks—simulated unilateral redistricting and actual, adopted plans—along a variety of different metrics. The metrics we examine include (1) the advantage, which we will term definer’s advantage, conferred to the map-drawing party by a redistricting procedure (equivalent to $\delta $ from the Iowa example above); (2) deviation from proportionality; (3) deviation from a fairness target (accounting for geographic biases in a state that might advantage one party); (4) partisan bias induced by a redistricting procedure; and (5) the efficiency gap, which measures the difference in the share of wasted votes between the parties. For proportionality, we examine the difference between the two-party vote share and seat share. For a fairness target, we take the midpoint of the most extreme maps possible under each party’s simulated unilateral redistricting procedure (Benadè et al. Reference Benadè, Procaccia and Tucker-Foltz2023). Partisan bias is the difference between seat share and vote share when votes are split evenly between the parties.Footnote ¹³ We are agnostic as to the best metric used to evaluate a given redistricting plan; our goal is to show the performance of DCP, and its benefits, across a variety of reasonable measures.

The simulation results reveal that DCP dramatically reduces the partisan advantage conferred to a map maker as compared to URP. Figure 3 presents four maps that compare seats won by each party under the four redistricting procedures. The top two maps show the results of the unilateral redistricting simulations, with Democrats redistricting on the left and Republicans redistricting on the right; the bottom two maps show the results of DCP.

Figure 3 Maps of Simulation Results by Method and Party: These figures report the full set results for URP and DCP simulations. Hexagons labeled “D” indicate Democratic wins; Hexagons labeled “R” indicate Republican wins.

Of the 429 seats redistricted in the simulations, Democrats win 334 (77.9%) when they draw the maps unilaterally in every state. When Republicans draw all maps unilaterally, Democrats win 137 seats (31.9%). The simulations reveal a possible swing of 197 seats between parties through unilateral redistricting. These results represent a theoretical maximum for the shift in seats that could occur due to partisan gerrymandering. Our unilateral simulations are more extreme than those actually drawn in many states considered to be partisan gerrymanders because we impose limited constraints and maximize seats won with a strict vote cutoff of 50% (rather than creating a “toss-up” category). Importantly, these benchmarks are based on one snapshot of voter preferences (2020 Presidential Election vote), so subsequent shifts in voter preferences could produce real-world outcomes outside these bounds. For this reason, we compare the simulated results to actual performance using 2020 congressional election outcomes, so our measures of partisan preferences and election outcomes occur at the same time (November 2020).

DCP dramatically reduces the swing of seats between parties; in many states, the difference in seats won based on who defines and who combines falls to either zero or one. When Democrats draw the Define-stage map, they win 249 (58.0%) seats; when Republicans draw the Define-stage map, Democrats win 211 (49.2%) seats. When calculating the difference state by state (since some parties have a second- rather than first-mover advantage), the swing between parties based on first-mover versus second-mover status amounts to 46 seats, eliminating almost 80% of the swing in seats theoretically possible under unilateral partisan control of redistricting.Footnote ¹⁴ Figure 4 highlights the differences between the unilateral redistricting and DCP results. The comparison of light gray hexagons (districts that swing only under URP) to dark gray hexagons (districts that swing also under DCP) captures the reduction in seat swing due to a switch from URP to DCP.

Figure 4 Map of differences in simulation results by party. This map shows how the partisan division of states differ under URP and DCP. Hexagons marked “D” or “R” are seats that are always won by Democrats and Republicans, respectively, in both methods regardless of which party controls the process. Hexagons marked “d”, “r”, or “x” could be won by either party if they controlled URP. Hexagons marked “x” could be won by either party under DCP. The hexagons marked “d” or “r” would be won by Democrats and Republicans, respectively, under DCP.

We also evaluate the performance of URP and DCP under alternative scenarios including (1) uniform statewide vote swings to a 50–50 vote split in each competitive state, (2) uniform nationwide swings to a 50–50 vote split nationwide, and (3) for a selection of state legislative, rather than congressional, district maps. Appendices E.2–E.4 of the Supplementary Material report the results. In each case, DCP continues to dramatically reduce the advantage from unilateral redistricting, eliminating over 80% of the possible swing between parties. We also report outcomes when randomizing the first mover in Appendix E.5 of the Supplementary Material.

Table 1 summarizes results for Definer’s Advantage, along with the other metrics we consider. (We do not report a quantity for Definer’s Advantage for adopted plans because we do not observe seat share under the counterfactual that the out-party controlled the redistricting process.) The next two metrics evaluate the redistricting procedures based on deviations from target outcomes, specifically proportionality and a geometric fairness target (the average of the worst- and best-case map for each party, as defined in Benadè et al. (Reference Benadè, Procaccia and Tucker-Foltz2023)). We evaluate each of these metrics based on which party controlled the redistricting process in each state. For instance, for a simulated unilateral map for the party in power, we calculate the deviation in seat share from the (1) seat share proportional to a state’s vote share and (2) seat share based on the geometric fairness target. The first of these metrics illustrates how much proportional representation would improve based upon a state’s switch to DCP; the second illustrates how much closer to a geometric target (accounting for a map’s geographic biases) a switch to DCP would achieve. Smaller values in the table represent less-biased outcomes.

Table 1 DCP performance versus alternatives. This table reports the performance of DCP compared to unilateral redistricting and adopted plans. Definer’s Advantage for adopted plans is omitted since it would involve interpolating seat share under the scenario where the opposing party held control over the redistricting process. Partisan Bias is calculated only for states with 2020 Democratic Presidential Vote Share between 45% and 55%.

For both metrics, DCP improves upon both the simulated outcomes from URP and adopted plans (rows 2 and 3 in Table 1). We estimate, for example, that if every state drew their map according to a unilateral process controlled by the majority party of the lower house of the state legislature, and then switched to DCP with the same party serving as the definer, deviation from proportionality would be cut by over one third and deviation from the fairness target would be cut by three quarters. Appendix F of the Supplementary Material reports full results broken out by state redistricting procedure. We find that DCP achieves reduced deviations from proportionality compared to enacted maps in states with Legislature or Political redistricting procedures and has comparable or slightly greater deviations from proportionality compared to enacted maps in states with Independent Commissions and Courts or Special Masters. DCP improves upon or matches adopted plans regardless of redistricting procedure in terms of deviations from the geometric fairness target. Figure 5 summarizes these results graphically. For each state in the figure, we plot the actual seat share from the redistricting process and the estimated change under DCP (denoted by the line and arrow). All but two states would move closer to the fairness target after implementing DCP.

Figure 5 Comparing DCP to actual outcomes. This figure displays the comparison between DCP and the actual outcome based on the state’s post-2020 redistricting process. The x-axis reports the midpoint between outcomes when each party acts as a URP. The y-axis reports the seat share. The point where each line originates denotes the projected outcome of the post-2020 redistricting. The point of each arrow denotes the DCP projected outcome. For reference, we also include a 45-degree line (proportional representation) and a line illustrating seat shares for an unbiased but majoritarian electoral system that follows the cube law. The sample includes states with four or more congressional districts and a URP midpoint between 0.3 and 0.7. First mover for DCP is determined based upon the party controlling redistricting or (where not applicable) the majority party in each state.

To determine partisan bias and efficiency gap for adopted plans, we gathered data on each metric from PlanScore.Footnote ¹⁵ We replicated the partisan bias and efficiency gap calculations for our simulated URP and DCP maps and compared these measures to the PlanScore estimates. DCP dramatically reduces partisan bias compared to URP. It modestly reduces partisan bias compared to enacted maps, with improvements primarily where legislatures controlled redistricting or political commissions. DCP dramatically reduces the efficiency gap compared to URP and achieves close to the same efficiency gap as for Adopted Plans. When comparing across states based on redistricting method as in Table F.1 in the Supplementary Material, the biggest improvements to efficiency gap occur in states with maps produced by a Legislature or Political Commissions and results are comparable to those in states with Independent Commissions.

Overall, DCP exhibits significant improvements compared to our benchmark procedures and actual maps across a range of different metrics. Importantly, the comparison to enacted maps is not one to one, since our DCP simulations necessarily assume fewer constraints than real-world redistricters face. Thus, the fact that we still observe similar or less extreme maps in our simulations illustrates the powerful tendency of DCP to temper extreme redistricting outcomes. In Appendix B.5 of the Supplementary Material, we also calculate benchmark comparisons between DCP and URP based on an analytical model, and we find that DCP improves upon or matches the benchmark results from URP.

4.2 Compliance with the Voting Rights Act

One potential concern for adopting DCP is the ability to use it to draw maps while complying with the federal Voting Rights Act (VRA), in particular by preserving majority–minority districts. Importantly, the districts produced under DCP will face the same scrutiny as districts created through any other map-drawing process. Under DCP, the judiciary would of course continue to enforce Section 2 of the VRA, and plaintiffs might challenge redistricting plans in court. If a judge finds in favor of a plaintiff, the court may redraw the offending district or districts. As long as the federal judiciary continues to adjudicate claims about adherence to the VRA, resolution of disagreements about majority–minority districts will remain somewhat distinct from any state-level process for producing district maps. So realistically, the federal courts, not DCP or any other process, will ultimately resolve conflicts between the parties over the number of majority–minority districts required to satisfy the VRA.Footnote ¹⁶

Nonetheless, map drawers can adjust DCP explicitly to incorporate the creation of majority–minority districts, for instance, by determining the boundaries of majority–minority districts before implementing DCP for the remaining districts. When drawing a fixed number of majority–minority districts, will DCP continue to produce beneficial results if used for the remaining districts? To explore this question, we ran a series of simulations in Georgia, a state with several majority–minority districts and close to equal Democratic and Republican vote shares in the 2020 Presidential election, as follows:

1. 1. Using 2020 census data and Voting Tabulation Districts, use the shortburst algorithm to generate four majority-Black districts.

2. 2. Freeze the four majority-Black districts in the map.

3. 3. Run the unilateral and DCP simulation algorithms to generate the boundaries of the remaining 10 congressional districts, and record the results from each algorithm.

We ran the above procedure 10 times. In each simulation, the boundaries of the four majority-Black districts were different (but were all concentrated in the Atlanta Metro area). Figure 6 shows the results of the simulations. Across all 10 simulations, there are substantial gaps in the number of Democratic seats depending on the party controlling redistricting unilaterally (e.g., a 3–6 seat gap), but much smaller gaps under DCP. In seven of the simulations, both parties reached the same number of Democratic seats, and in three simulations, the parties had a one-seat difference.

Figure 6 Simulation results for VRA-compliant Georgia congressional districts. This figure illustrates the results of URP and DCP simulations in Georgia when we account for VRA-compliant districts by drawing and freezing four districts before initiating the URP and DCP map-drawing processes.

These results demonstrate that if majority–minority districts can be drawn and then frozen in place, DCP can still produce an equitable result that reduces partisan gerrymandering in the remainder of the state.