Electoral Benefits

According to Ricco Garcia, a Democratic political operative with extensive redistricting experience in Texas: “Politicians are interested in the companies [being assigned to their district or party] for fundraising.”Footnote ⁵ This claim is supported by copious academic literature on corporations as a source of campaign finance, particularly to politicians representing districts where firms are located (e.g., Bombardini and Trebbi Reference Bombardini and Trebbi2011). Gopoian (Reference Gopoian1984), for example, finds that firms are nearly as likely to give to the representative of their headquarters as they are to the representatives who sit on that firm’s most relevant committee, and that both are more important than candidate ideology. Fouirnaies and Hall (Reference Fouirnaies and Hall2014) find that corporate PACs disproportionately donate to the incumbent party, helping create the incumbency advantage, while Ovtchinnikov and Pantaleoni (Reference Ovtchinnikov and Pantaleoni2012) find that individuals are more likely to contribute to incumbents when firms in a district cluster in a single industry.

This money can help win seats: “war chests” can deter potential challengers, can be re-allocated to marginal legislators within the own party to build intra-party support, and can be transferred by politicians as “party dues” in exchange for advantageous Congressional committee assignments (Jenkins Reference Jenkins2021).

In addition to being a source of money that parties can use to advertise their candidates, firms are visible actors in local economies, giving representatives opportunities to attend events such as ribbon cuttings. According to Garcia, “When you’re at these things you get to interact with [the] Governor, other Committee Chairmen, etc. which helps you get to know them and ultimately makes you powerful,” a mechanism also highlighted by Fenno (Reference Fenno1977). Site visits from government officials can also boost firms’ market valuations, indicating some sort of reciprocity (Schuler et al. Reference Schuler, Shi, Hoskisson and Chen2017). Overall, firms’ public events in home districts provide opportunities for parties and politicians to advertise themselves and credit-claim for their activities in the district.Footnote ⁶ Firms can also influence voters more directly to assist politicians by mobilizing their employees (Hertel-Fernandez Reference Hertel-Fernandez2018) or manipulating employment decisions (Bertrand et al. Reference Bertrand, Kramarz, Schoar and Thesmar2018).

Finally, and especially relevant for our purposes, Yang (Reference Yang2023) shows that headquarters are particularly politically valuable: they have large economic spillovers, meaningful symbolic value for the public at large, and direct electoral effects for incumbents, as evidenced by the massive subsidies used to attract and retain them. To borrow one such example from Yang: Amazon’s plan to add a second headquarters generated incentive packages from 238 state and local governments in the US and Canada, with offers reaching $8.5 billion.

Power and Prestige

Firms can also help politicians elevate their position within their party, an important criterion for advancing in Congress and to higher office. For example, politicians often receive committee appointments related to the sectors of the firms in their districts. Ricco Garcia notes that “one of the reasons firms are drawn into districts is to [help politicians] get on prestige committees.” This builds a dependency between firms and politicians: firm support helps politicians advance in seniority on relevant committees, which in turn improves the value of those firms’ privileged access to government services. At the same time, serving on prestige committees helps politicians attract more campaign contributions from firms both inside and outside of their districts (Grier and Munger Reference Grier and Munger1991).

Secondly, local businesses are a vital source of information and potent public signal about the health of the local economy for parties and politicians; this information enables them to sponsor relevant legislation, engage in more credit claiming, and improve policymaking, all of which is directly tied to re-election prospects (Fenno Reference Fenno1977; Hall and Deardorff Reference Hall and Deardorff2006; Hertel-Fernandez, Mildenberger, and Stokes Reference Hertel-Fernandez, Mildenberger and Stokes2019; Yang Reference Yang2023).

Finally, firms may provide valuable connections in politicians’ careers after office, improving their value as “revolving door” lobbyists or on corporate boards (Blanes i Vidal, Draca, and Fons-Rosen Reference Blanes i Vidal, Draca and Fons-Rosen2012).

Firm Heterogeneity

If a firm’s value to a politician is in its contributions to that politician’s electoral, financial, and career development, especially through visibility, prestige, economic spillovers, and financial support, we might expect that some firms are more valuable than others. Firms may be especially coveted due to their size, the sector they operate in, their popularity, or their willingness to donate to their representative’s campaign. Similarly, some firms may be “toxic” for a representative in a district (McDonnell and Werner Reference McDonnell and Werner2016), something also pointed out by Garcia. For example, a pro-union candidate may not be interested in anti-union firms, or a candidate with a salient position on environmental issues may not want to represent an oil company.

Our theory does not exclude that, in certain cases, specific politicians may not be interested in specific firms or that they may be more interested in some firms than others. Instead, we conjecture that despite the idiosyncrasies and constraints at the state, firm, or politician level, there are strong reasons both for parties and individual politicians to covet firms in their districts (as opposed to in districts of rivals); therefore, we hypothesize that firms will generally be an object of desire for mapmakers.Footnote ⁷ This is particularly true for the sorts of large and visible firms and business units (headquarters) found in our sample. Furthermore, given the emphasis on electoral, financial, and career-building incentives, our theory should also apply to other influential non-publicly traded firms, large employment centers separate from headquarters, military bases, major economic infrastructure like ports and airports, prisons, or major events venues; it might even extend to corporate executives.Footnote ⁸

Below, we present a stylized illustration of our theory in which we assume, for tractability, that only seats and firms are desirable for politicians and in which all firms are of interest.Footnote ⁹

A State-Wide Proportional Redistricting Plan

First, consider a mapmaker seeking to allocate both seats and firms proportionally to voters, such that Democrats win 2 of 5 seats and 40 of 100 firms. Figure 2 provides an example. Districts 1 (blue) and 4 (green) are majority-Democratic, with 55.0% and 52.5% of the vote share respectively, and contain 15 and 25 firms. The table’s bottom row presents state-wide summary statistics: the state-wide vote share, the percentage of districts won by Democrats, and the percentage of firms allocated to districts with a Democratic majority.

Figure 2. New Gerryland Redistricting Plan 60: Democrats Win Seats and Firms Equal to Their Vote Share

Note: Each colored and numbered area represents a different district.

It is also possible to draw maps where seats are proportional to voters, but where the allocation of firms is not. In both panels of Figure 3, Democrats win 2 of 5 seats, but their firm yield varies considerably. Plan 41 in Panel a yields 32 firms for Democrats while Plan 97 in Panel b yields 57, a large and politically meaningful difference: even when seat allocations must be proportional to vote shares, mapmakers can reallocate 25% of a state’s total firms from one party to another. Plans that look seat-neutral may favor one party in terms of firms, allowing mapmakers to gerrymander firms.

Figure 3. New Gerryland Redistricting Plan 41 and Redistricting Plan 97: Democrats Win Seats Proportional to Their Vote Share, but May Receive Disproportionately Fewer Firms (A) or More Firms (B)

Note: Each colored and numbered area represents a different district.

A Republican-Biased Plan

Now consider a biased mapmaker seeking to favor their party. Since Republicans control the majority of voters, they might prefer a plan that holds Democrats to 1 seat, giving Republicans 4 out of 5 seats and maximizing their delegation.

Plan 20, displayed in Figure 4, is one such plan. It allocates 80 firms to Republicans (and 20 to Democrats), what we might expect from a 1D/4R split if seats were proportional to firms. Republicans strictly prefer Plan 20 to any plan giving them 3 seats: 68 firms are the most they can obtain with any 3-seat plan, whereas in Plan 20 they receive 80 firms. But even among plans where Republicans win 4 seats, there is substantial variation in firm allocations: Plan 1, shown in Figure 5, Panel a, gives Republicans 88 firms, while Plan 48, shown in Panel b, gives them only 65 firms. The range of firm allocations is 23, similar to the range of 25 for 2D/3R plans. Therefore, firm gerrymandering may exist within extreme seat allocations.Footnote ¹²

Figure 4. New Gerryland Redistricting Plan 20: Democrats Win Disproportionately Few Seats and Equally Disproportionately Few Firms

Note: Each colored and numbered area represents a different district.

Figure 5. New Gerryland Redistricting Plan 1 and Redistricting Plan 48: Democrats Win Disproportionately Few Seats, and Even Fewer Firms (A) or a Proportionate Number of Firms (B)

Note: Each colored and numbered area represents a different district.

Full Distribution of Gerrymandering Possibilities

New Gerryland has only 20 precincts, so we can draw all 100 feasible redistricting plans and summarize their characteristics, sketching a possibility frontier for both seats and firms. This frontier identifies which outcomes might be gerrymandered by revealing if they are statistical outliers, falling in the extremes of the seat distribution, firm distribution, or the joint distribution of both.

Seat Gerrymandering Defined

First, we look at the empirical distribution of seats. For each of the 100 plans, we calculate how many seats Democrats would win and present that distribution in Figure 6. Each bin represents a possible seat allocation, from 5 Republican to 5 Democratic seats; each bin’s height represents how many possible plans result in that allocation. Although there are six conceivable outcomes, only three are feasible: 1D/4R, 2D/3R, and 3D/2R. The expected outcome of redistricting in New Gerryland is a 2D/3R plan—occurring in 55 out of 100 plans—consistent with an expectation that a neutral plan might allocate seats proportional to voters.

Figure 6. New Gerryland: Histogram of Seat Allocation in Population of Feasible Redistricting Plans

Note: Each bin represents a possible seat allocation, from 5 Republican to 5 Democratic seats; each bin’s height represents how many possible plans result in that allocation.

Which of the alternative outcomes might we call a seat gerrymander? A 1D/4R seat allocation biased toward Republicans arises in 44 out of 100 feasible plans, illustrating that not all deviations from that expectation are gerrymanders. A 3D/2R seat allocation biased toward Democrats, however, only occurs once among all 100 feasible plans. Hence, the 3D/2R seat allocation falls at the 99th percentile of the seat distribution, providing compelling evidence of seat gerrymandering. A one-sided p-value for a randomly selected plan being as, or more, favorable to Democrats than a 3D/2R realization is 0.01, while the p-value of selecting a random plan as or more favorable to Republicans as a 1D/4R seat allocation is 0.44.

Firm Gerrymandering Defined

We can extend the same logic for seats to firms to identify firm gerrymanders. Looking again at each of the 100 plans, we calculate how many firms fall into districts that Democrats win, presenting that distribution in Figure 7. In a proportional plan, 40 firms land in Democratic districts, which we find near the distribution median. The modal outcome, occurring in 14 distinct plans and represented by the tallest bar, places 20 firms in Democratic districts. A plan where Democrats receive the minimum possible 12 firms falls at the 99th percentile of Republican firm gerrymandering, while the plan where they receive the maximum possible 70 firms falls at the 99th percentile of Democratic firm gerrymandering. With a one-sided quantile threshold of 0.1, we can consider the 10 left-most plans (out of 100) to be Republican firm gerrymanders and the 10 right-most plans to be Democratic firm gerrymanders. Hence, any New Gerryland plan allocating 19 or fewer firms to Democrats is a firm gerrymander for Republicans, while any plan allocating 51 or more firms to Democrats is a firm gerrymander for Democrats.

Figure 7. New Gerryland: Histogram of Firm Allocations in Population of Feasible Redistricting Plans

Note: Each bin’s height represents the number of simulated plans that result in the allocation of firms represented in the horizontal axis.

Joint Seat and Firm Gerrymandering

Firm and seat gerrymandering interact in important ways, as apparent in the joint distribution of firms and seats in Figure 8. The vertical axis indicates seats allocated to Democrats, while the horizontal axis presents firms allocated to Democrats; darker bars indicate more frequent firm-seat combinations. The lightest bars appear in cells for 1D seat/12 Democratic firms and 3D seats/70 Democratic firms as these allocations only occur once among the 100 feasible redistricting plans.

Figure 8. Joint Distribution of Seat and Firm Allocation Pairs in Population of Feasible Redistricting Plans for New Gerryland

Note: The vertical axis indicates seats allocated to Democrats, while the horizontal axis presents firms allocated to Democrats; darker bars indicate more frequent firm-seat combinations.

The top right of the figure is a plan that allocates 3 seats and 70 firms to Democrats. It is as extreme as possible on both dimensions and therefore appears to be the optimal choice for Democrats. According to our definitions above, it is both a seat gerrymander (because there are 3 or more seats allocated to Democrats) and a firm gerrymander (because there are 51 or more Democratic firms). But importantly, because there is only one map allocating 3 seats to Democrats, we cannot positively conclude that by selecting this plan, mapmakers intentionally maximized firms rather than targeting seats.

However, consider the most Republican extreme, a redistricting plan allocating only 1 seat and only 12 firms to Democrats. In this case, we have enough leverage to disentangle firm targeting from seat targeting. If Republicans were merely trying to maximize seats, they need not pick the most extreme plan in the bottom left; there is a large range of options for how many firms they could obtain among the 44 plans that do so. These options form the seat-conditional firm distribution, supplying Democrats with anywhere from 12 to 35 firms, with 20 being both the mode and the median. If Republicans were to allocate only 12 firms to Democrats we would consider it a seat-conditional firm gerrymander, or firm targeting, since an allocation of firms as extreme occurs only 1 out of 44 times (p-value = 0.023) among the set of plans that yield 1D/4R seats.

Disambiguating between merely maximizing seats versus firms being targeted explicitly by mapmakers is complex. If we define firm gerrymandering only as an extreme firm allocation relative to the unconditional full set of possible maps, we may miss cases where firms are targeted in conditional firm gerrymanders. Consider plans in the 2D/3R row. Given this allocation of seats, Democrats may yield anywhere from 32 to 57 firms. The 57-firm plan is extreme both overall/unconditionally and conditional on its firm allocation and is a Democratic firm gerrymander either way; however, a 32-firm plan is only extreme in the conditional distribution and is a Republican conditional firm gerrymander but not an unconditional one. Either a 32-firm allocation or a 57-firm allocation, nevertheless, provides strong evidence that mapmakers prized firms, given some reason to select a 2D/3R plan. Hence, it is important to analyze both the overall/unconditional allocation of firms into districts and the allocation conditional on the number of seats in the enacted plan to detect firm targeting by mapmakers.

Importantly, the New Gerryland example exposes that extreme outcomes on the firm distribution could be intentional (i.e., reflecting specific targeting by mapmakers), or merely a by-product of the mapmakers’ focus on seats. Regardless of why a firm gerrymander occurs, an extreme, disproportionate allocation of firms to one party is consequential: it structurally aligns those firms with the party in power that drew the lines, changing incentives for both firms and politicians.

Picking the Optimal Plan

Mapmakers may not always want to select the plan that maximizes either firms or seats or both. There are a number of potential reasons why they may prefer a second best. First, though we think most firms will have value, not every firm will. Second, even members of the same party will have different preferences about the exact borders, as allocating firms or voters into one district implies taking them away from another. Third, all maps involve speculation about the future: a good map today may not be good tomorrow as populations and politics change. Finally, mapmakers may be optimizing over more than two dimensions, including things besides firms and voters. These constraints alone make maximization (even of seats) unlikely in many cases.

Consider, for example, Figure 9, Redistricting Plan 100. This plan maximizes both seats (3 of 5) and firms (70 of 100) for Democrats despite a minority of 40% of the voters. While Democrats win three seats in this plan, their margins are slim. The safest seat is won by only 5 percentage points, and the others by less than 3; a normal-size national swing would endanger 2 of the 3 seats. Democratic incumbents or a risk-averse mapmaker might prefer 2 safe seats to 3 marginal ones, and may instead maximize the firms they yield conditional on winning just 2. On the other hand, Democratic mapmakers might have more optimistic expectations. If demographic changes in their marginal districts bode well, they might ambitiously opt to seize 3 seats, after all, betting that they will become safer over time.

Figure 9. Plan 100: Democrats Win Disproportionately Many Firms and Seats, but Their Vote Margins Are Narrow

Note: Each colored and numbered area represents a different district.

The discussion above highlights that redistricting is an idiosyncratic process, relying on political geography, incumbent demands (Forgett and Platt Reference Forgett and Platt2005), partisan constraints, judicial scrutiny, party power structures, and much more. Fully capturing the tradeoffs in a simplified example like New Gerryland is impossible; nonetheless, we have outlined clear expectations about how partisan mapmakers might draw lines with firms in mind and a straightforward method for identifying when these expectations are met.

State Sample

We conduct simulations with 18 districting plans for the 14 states with the required precinct-level data (see Table 1).Footnote ¹³ Most of the results and statistics we calculate are state-specific, meaning that our inferences do not depend on which states are included in our analysis. As such, we can fairly assess the question of whether firms are ever gerrymandered in a partisan manner. One limitation of our sample, however, is that compared to Democratic states, Republican states tend to be larger and have more firms. In addition, many of the available Democratic states are clearly partisan while several of the Republican are swing states. In practice, this means that we have more variation across Republican states compared to Democratic states, allowing for stronger claims about the firm gerrymandering in red states; in many Democratic states, we are unable to separate firm from seat gerrymandering.

Table 1. State Districting Plans in Our Analysis

Firm and Precinct-Level Data

The simulations require complete precinct-level data on population (to satisfy One Person, One Vote requirements), racial and ethnic characteristics (to satisfy Voting Rights Act compliance), and vote shares (to calculate district winners) linked to precinct geographies.Footnote ¹⁴ We draw these data from the Metric Geometry and Gerrymandering Group’s MGGG States Project.Footnote ¹⁵ We link these data to the geolocated addresses of publicly traded US firms’ headquarters acquired from COMPUSTAT and to other demographics from the US Census. As noted earlier, our sample of firms and units constitutes a most likely case for our hypothesis, given their political and economic salience. We believe that large publicly traded firms are the most valuable ones to politicians (given their size and visibility) and that headquarters are probably these firms’ most valuable location on average (Yang Reference Yang2023),Footnote ¹⁶ though we acknowledge that both private firms and major non-headquarters facilities may also be gerrymandered.

We include an analysis of the characteristics of firms and precincts in our database in Supplementary Appendices D and E.

Simulation Mechanics

Our simulation follows the state-of-the-art Sequential Monte Carlo (SMC) procedure of McCartan and Imai (Reference McCartan and Imai2020), described in Supplementary Appendix B, which produces representative samples of legal redistricting plans (Kenny et al. Reference Kenny, McCartan, Simko, Kuriwaki and Imai2023). Considering a precinct map as a network with precincts as nodes and precinct adjacency as edges connecting those nodes, the process of generating a district map involves selectively removing edges of that network. Our simulation procedure has five steps. First, we create the precinct adjacency matrix from a state precinct map.Footnote ¹⁷ Second, we conduct the SMC procedure, drawing 50,000 plans per state, with constraints for compactness, contiguity, county boundaries, and majority-minority districts, thereby ensuring that each district is legally valid.Footnote ¹⁸ Third, we overlay each plan with our dataset of geolocated firms. Fourth, we infer expected two-party vote shares for every district in every plan. Finally, we assign firms to parties based on district vote shares.Footnote ¹⁹

Estimating District Vote Shares

In estimating vote share for simulated districts, researchers typically make a number of key assumptions. Consider the 2012 Congressional districts for a given state. Once we simulate 50,000 plans, we must identify how many seats Democrats are expected to win in each plan. To do this, we identify how each precinct voted in the 2012 House of Representatives elections, then sum each party’s vote in each district in each plan.

This makes an implicit district invariance assumption: a precinct’s vote is invariant to the district that precinct is in. Moreover, for some states, precinct-level vote totals for the election of interest may not be publicly available, and researchers may use 2012 Presidential vote share or 2014 House of Representatives vote share to infer how precincts would vote under simulated plans in the 2012 House of Representatives. Using these introduces new assumptions: for the 2012 Presidential election results, that vote share is invariant to the ballot item, and for the 2014 House of Representatives election results, that vote share is stable over time.

These assumptions are standard in the literature and discussed further in Supplementary Appendices C and D. To weaken our reliance on them, we take a novel approach. We first average the precinct-level vote for up to four proximate elections to produce an estimate of a precinct’s latent vote share for each party, rather than rely on a single, possibly idiosyncratic, election to infer precinct-level vote. Furthermore, Supplementary Appendix C presents an extreme bounds analysis that explores the consequences of shifts in vote share for our results. The analysis details how firm and seat counts respond to changes in vote shares in marginal districts, increasing the variance in potential outcomes in a way that tests the district invariance assumption. While our main results are unaltered, the extreme bounds analysis reveals that states pushing the limits of firm gerrymandering are more vulnerable to swings in seat shares.

Assigning Firm Allocations to Parties

Having identified the partisan balance of each district in each simulated plan, we can calculate test statistics to capture seat or firm gerrymandering. Just as we calculate the number of seats that Democrats win to measure seat gerrymandering, our primary test statistic of firm gerrymandering calculates the proportion of firms that fall in districts with a simple Democratic majority.

In states where Democrats (Republicans) draw the lines, we expect that the realized proportion of firms in Democratic (Republican) districts will be much higher than in the modal simulated plan. In states redistricted by non-partisan or bipartisan agents, the realized proportion of firms in Democratic (and Republican) districts should be closer to the modal simulated plan.

Comparing Simulated Plans to Enacted Plans

Figure 10 displays the simulated distribution of firms located in districts won by Democrats across 14 states; these are the null distributions from the 50,000 simulations per state. We present one histogram for each of the 14 states (covering 18 redistricting plans) in our sample. This null distribution represents our expectations for how firms would be allocated across districts if districts were drawn in an as-if random way, using knowledge only of precinct populations and racial composition and considering only the constitutional constraints of compactness, contiguity, minimizing county splits, and the Voting Rights Act (VRA).Footnote ²⁰

Figure 10. Distributions of the Fraction of Firms Assigned to Democratic Districts by State Arising from Our Simulations

Note: these null distributions are based on our simulated data. The vertical dotted lines represent 2012 enacted plans, while the vertical dashed lines represent plans that were redrawn after courts struck earlier plans after 2012.

Figure 10 displays histograms of the proportion of firms expected to fall in districts won by Democrats, in 5% bins. The vertical dashed line represents the actual enacted plans. The mass under the distribution to the left or right of the vertical line tells us how extreme an enacted redistricting plan is compared to simulations. If 50% of plans land both to the right and left of the enacted plan, that enacted plan falls on the simulated median; it meets our expectations under the null distribution and we might conclude that firms are not gerrymandered. If 90% of simulated redistricting plans fall to the right (left) of the vertical line representing the enacted plan, then that plan biases in favor of locating firms in Republican (Democratic) districts, suggesting that factors other than constitutional requirements are influencing firm placement.

If an enacted plan falls in the bottom 1% of the null distribution, it means that out of every 100 simulated redistricting plans such a Republican-biased plan appears only once—or that it happened fewer than 500 times out of 50,000 simulations. Likewise, if a plan falls at the 99th percentile, then out of every 100 simulated plans, we only observe one plan as extreme in its bias favoring Democrats. We can interpret these numbers as p-values: they encode how extreme an observed plan is relative to a null distribution and form the basis for our statistical inference.

Row 1 of Figure 10 shows states in which Democrats controlled the redistricting process. In each of these states, the distribution of simulated plans is skewed to the right—almost no simulation allocates more than 40% of the firms to Republicans in these states—indicating that due to the geography of voters, more firms fall naturally into Democratic districts. However, we observe that the enacted plans (dotted vertical lines) consistently fall near the right edge of the simulated distribution: Democrats place a disproportionate number of firms in districts they control in states where they draw the lines, beyond what the skewed natural geography of firms and voters might dictate.

States in Row 2 of Figure 10 use some form of a commission to decide district boundaries, which, presumably, would generate less gerrymandered outcomes as they should not exploit redistricting as a mechanism to bind firms to politicians’ districts. Consistent with this expectation, we find the enacted plan falls at a global or local mode. Arizona’s commission is the exemplar of insulation from politics, as its maps become law without legislative approval. Correspondingly, we find that the enacted plan sits at the center of the distribution and the global mode in Arizona, where the simulated distribution is relatively symmetric. Iowa’s commission, by contrast, allows a (Republican) legislative veto, reducing its insulation from politics. And though its enacted plan falls at a local mode, it still appears to favor Republicans. (The fact that Iowa only has 4 districts complicates inference.)

Row 3 contains states where Republicans led redistricting and courts did not intervene. In the first two cases, the realized plans fall far to the left of the realized distributions; Republicans capture more firms than expected. This result, again, indicates that the party drawing the lines places a disproportionate number of firms in districts they control, even accounting for the natural geography of firms and voters. Ohio and Wisconsin do not appear to be firm gerrymanders; later, however, (Figure 18), we will show that Ohio, Texas, and Georgia are all conditional firm gerrymanders.

Row 4 displays plans in states where Republicans drew lines that were later redrawn by courts.Footnote ²¹ There are two vertical lines, a dotted line for the original plan and a dashed line for those resulting from court orders. In every state, the party-drawn enacted plans placed a higher number of firms in Republican districts than expected, consistent with results in Row 3. Furthermore, every court-ordered plan shifted the firm allocation toward the median of the simulated distribution; costing Republicans’ firms, especially in Pennsylvania.

Figure 11 summarizes the results, collapsing each state’s enacted plans onto a single graph displaying quantile values comparing those plans to the simulated null distributions.Footnote ²² For example, a value of 0.25 means that in 25% of simulated plans, the same number or fewer firms than in the enacted plan are placed in Democratic districts. Hence, a plan with a value close to 0 favors Republicans, while a value close to 1 favors Democrats.

Figure 11. Plans Drawn by Republicans (Democrats) Put Fewer (More) Firms in Democratic Districts Compared to Simulated Plans

Note: Red indicates Republican mapmakers; Blue indicates Democratic mapmakers; Purple indicates Commission-drawn maps; Green indicates court-drawn maps.

The results reveal a consistent pattern. When Republicans draw the lines, firms end up in Republican districts beyond what we would expect in the absence of firm gerrymandering (generally with a quantile <0.1). Similarly, when Democrats draw the lines, firms end up in Democratic districts beyond what we would expect in the absence of firm gerrymandering (generally with a quantile >0.9). When courts redraw partisan maps (creating a within-state comparison), the firm allocations always move toward the middle, indicating an increasingly nonpartisan allocation. Note the variation in how much a court’s map improves may reflect the particular legal challenge and the court’s composition, structure, and mandate.Footnote ²³ When commissions draw the map, the firm distribution falls closer to the center as well, most notably in Arizona, where we have a reasonable sample size and highly insulated redistricting process. (Iowa’s p-value is 0.094, indicating a Republican gerrymander.)

We can combine these independent state-level tests into a global p-value (Caughey, Dafoe, and Seawright Reference Caughey, Dafoe and Seawright2017), testing the sharp null that no states have firm gerrymandering. Our theory tells us that in states drawn by Democrats, we expect quantiles in the right tail, and the opposite for Republicans, so first we convert quantiles to one-sided p-values. In states with commission-drawn plans, we expect quantiles close to 0.5, so we convert those to p-values by subtracting 0.5 such that if an enacted plan produces the simulated modal number of firms for Democrats, its p-value would be 0. Following Caughey, Dafoe, and Seawright (Reference Caughey, Dafoe and Seawright2017), we then take the Fisher product and calculate a global p-value of 1.11 × 10⁻⁹—robust statistical evidence that firm gerrymandering exists in at least some states.

Optimizing for Seats, Firms, or Both

Having established unconditional firm gerrymandering exists, we turn to conditional firm gerrymandering for evidence that mapmakers specifically target firms. As we show in New Gerryland, identifying when firms are targeted is challenging, since acquiring more seats generally leads to acquiring more firms.

To show some ways that firm gerrymandering appears in practice, we provide three case studies—Oregon, Pennsylvania, and Texas—working through both (i) joint distributions of firm-and-seat allocations, and (ii) conditional distributions of firm allocations, holding the number of seats fixed. Oregon provides a case where firm and seat targeting by mapmakers may be observationally equivalent. Pennsylvania shows that even when there is an extreme partisan seat gerrymander, we can still sometimes disentangle seat gerrymandering from firm gerrymandering. Finally, in Texas, we show that mapmakers can gerrymander firms even without gerrymandering seats.

Oregon: When Firm Targeting and Seat Targeting Are Observationally Equivalent

Figure 12 presents the simulated joint distribution of seat (vertical axis) and firm (horizontal axis) allocations in Oregon. Each bar is a unique combination of firms and seats; darker bars indicate a higher proportion of simulated plans with that allocation. The red circle marks the 2012 Democratic-enacted map.

Figure 12. Oregon’s Joint Distribution of Firms and Seats from Simulation

Note: The vertical axis indicates seats allocated to Democrats, while the horizontal axis presents firms allocated to Democrats; darker bars indicate more frequent firm-seat combinations. The circle marks the enacted plan.

In Oregon, there were 5 seats and 48 firms to be allocated. No simulated plan granted Democrats more than 4 seats or 45 firms. In practice, Democratic mapmakers enacted a plan allocating 4 seats and 44 firms to themselves, maximizing the number of feasible seats and taking an unusually large number of firms.

Is this a seat gerrymander, a firm gerrymander, both, or neither? The answer is both: it is a seat gerrymander since allocating 4 seats to Democrats occurs in only 5.8% of simulations; it is a firm gerrymander since allocating 44 firms or more to Democrats occurs in only 6.3% of simulations.

Nevertheless, any plan that allocates 4 seats to Democrats must also allocate at least 43 firms to Democrats, so observing a plan with 4 seats and 44 firms does not require deliberate firm gerrymandering. The extreme allocation of firms we observe in Oregon might be a consequence of mapmakers’ maximizing seats.

In New Gerryland, we examined the joint distribution of firm allocations (Figure 8). Doing so taught us that to learn whether firms are targeted, we might consider the conditional distributions of firms holding seats fixed. Figure 13 presents that data for Oregon, focusing on the 2,893 plans that allocate exactly 4 seats to Democrats as in the enacted plan. While we previously found that Oregon is an unconditional firm gerrymander, looking at the 4-seat conditional distribution, we cannot say that firms were targeted beyond seats due to the natural geography of firms and voters. The range of feasible firm allocations is so narrow in the conditional distribution—from 43–45 firms—that variation within it may not be meaningful.Footnote ²⁴

Figure 13. Oregon’s Distribution of Firms Conditional on Four Democratic Seats as in Enacted Plan

Note: Each bin’s height represents the number of simulated plans that result in the allocation of firms represented in the horizontal axis. The dashed line represents the enacted plan.

Pennsylvania: Optimizing for Firms and Seats

In Pennsylvania, by contrast, we can show more conclusively that mapmakers targeted firms beyond seats: Republican mapmakers nearly maximized firm allocation conditional on seizing the maximum feasible number of seats. Figure 14 presents the simulated joint density of seat and firm allocations in Pennsylvania.Footnote ²⁵ There are 18 seats and 401 firms to be allocated. The simulated range of seats allocated to Democrats is 4 to 9; the range for firms is 108 to 309.

Figure 14. Pennsylvania’s Joint Distribution of Firms and Seats from Simulation

Note: The vertical axis indicates seats allocated to Democrats, while the horizontal axis presents firms allocated to Democrats; darker bars indicate more frequent firm-seat combinations. The circle marks the enacted plan.

In 2012, Republican mapmakers allocated the lower bound of 4 seats to Democrats. This is a Republican seat gerrymander (p-value = 0.001), as only 50 out of 50,000 plans have 4 Democratic majority districts. Republican mapmakers allocated only 114 firms to Democrats in their plan. This is also a clear unconditional Republican firm gerrymander (p-value = 0.0002), as only 12 of 50,000 plans give fewer firms to Democrats.

Moreover, the 2012 Pennsylvania map is a conditional firm gerrymander as well. Figure 15 shows the conditional distribution of firms Democrats would receive if they won 4 seats, which occurs in only 50 of 50,000 of simulations; in this distribution, the range of firm allocations spans from 111 to 207. The enacted plan allocates only 114 firms to Democrats, nearly the most extreme conditional allocation of firms possible (only 4 of the 50 simulated plans are more extreme), suggesting that Pennsylvania mapmakers targeted firms above and beyond seats. Additional evidence of firm gerrymandering of Pennsylvania can be found in Supplementary Appendices D and E.

Figure 15. Pennsylvania’s Distribution of Firms Is Conditional on Four Democratic Seats as in Enacted Plan

Note: Each bin’s height represents the number of simulated plans that result in the allocation of firms represented in the horizontal axis. The dashed line represents the enacted plan.

While the Pennsylvania case may appear to be maximal for partisan mapmakers in seat-firm space, there is a hidden trade-off for mapmakers in choosing this allocation. By maximizing on both seats and firms they have spread their voters’ thinner, making more districts vulnerable to small swings in vote share, increasing the party’s risks in the event of a wave election. We explore vulnerability in the robustness checks in Supplementary Appendix C, where we change the margins that determine the partisan alignment of districts.

Texas: Ceding Seats While Capturing Firms

In Texas, Republican mapmakers chose not to maximize their seat allocation, possibly because a seat grab would spread votes thin and, hence, generate major vulnerabilities amidst rapid demographic change (see Supplementary Appendix C for an example of those risks). Surprisingly, perhaps, in fact, partisan seat maximization only occurs in 6 of the 12 partisan plans in our sample, suggesting that the constraints identified are fairly binding. While not a seat gerrymander, Texas is an unconditional firm gerrymander (p-value of 0.084) and a compelling conditional firm gerrymander (p = value of 0.021).

Figure 16 presents the simulated joint distribution of firm and seat allocations in Texas. There are 36 seats and 715 firms to allocate; Democrats may capture from 6 to 14 seats and from 78 to 467 firms. The enacted plan drawn by Republicans yields 11 seats to Democrats, surprisingly above the modal simulation outcome. A standard notion of partisan gerrymandering would reject the claim that Texas’ map was gerrymandered to favor Republicans in terms of seats.

Figure 16. Texas’ Joint Distribution of Firms and Seats from Simulation

Note: The vertical axis indicates seats allocated to Democrats, while the horizontal axis presents firms allocated to Democrats; darker bars indicate more frequent firm-seat combinations. The circle marks the enacted plan.

However, examining firm allocations suggests otherwise. The 215 firms that the 2012 enacted plan allocated to Democrats is substantially lower than the mean of 303 or the median of 317, suggesting that the Republican mapmakers preferred to over-allocate firms to themselves rather than seats.

Examining Texas’ conditional firm distribution (Figure 17), moreover, provides strong evidence that Texas is a firm gerrymander. Fixing the Democrats to 11 seats, the conditional distribution of firms ranges from 126 to 463, covering over 45% of the entire range. The 215 firms given to Democrats in the enacted plan falls far to the left within this distribution (p = 0.02). Even though Republicans chose a relatively bipartisan seat allocation, conditional on that choice, they allocated far more firms to themselves than can be explained by random chance.

Figure 17. Texas’ Distribution of Firms Conditional on 11 Democratic Seats, as in Enacted Plan

Note: Each bin’s height represents the number of simulated plans that result in the allocation of firms represented in the horizontal axis. The dashed line represents the enacted plan.

Figure 18 presents the conditional results for all maps. While a full discussion and state-by-state histograms can be found in Supplementary Appendix C, the main things to highlight are that 8 of the 12 partisan states are statistically significant conditional firm gerrymanders favoring the party in charge of mapmaking, including Georgia and Ohio, neither of which is an unconditional firm gerrymander. No partisan state is a partisan gerrymander for the party not drawing the lines, and all but one commission or court state is near the center of the distribution; furthermore, conditional on seats, both the Virginia and Minnesota court-ordered maps cease to be firm gerrymanders.

Figure 18. Plans Drawn by Republicans (Democrats) Put Fewer (More) Firms in Democratic Districts Compared to Simulated Plans, Using the Conditional Distribution

Note: Red indicates Republican mapmakers; Blue indicates Democratic mapmakers; Purple indicates Commission-drawn maps; Green indicates court-drawn maps.

Targeting of Firms Conditioning on Other Considerations

As noted earlier, one concern for dispositively identifying firm targeting is that precincts might be targeted by mapmakers for factors that might be co-located with firms: racial groups, urbanization, wealthy individuals, and more. Supplementary Appendix D presents a precinct-level analysis of unusual precincts (defined as ones that are consistently allocated to a different party in the simulations than in the realized plan), using data for the four states in which there is cross-party allocation of firms in unusual precincts.Footnote ²⁶ The analysis provides confirming evidence that unusual precincts containing firm headquarters are selected into co-partisan districts, controlling for racial composition, urban/rural status, and high-income households.Footnote ²⁷