Data and methods

In order to test our hypotheses, we use data from municipal referendums for open space preservation following a large literature on open space preservation proposals on state and local ballots (Altonji et al. Reference Altonji, Lang and Puggioni2016; Banzhaf et al. Reference Banzhaf, Oates and Sanchirico2010; Heintzelman et al. Reference Heintzelman, Walsh and Grzeskowiak2013, Kotchen and Powers Reference Kotchen and Powers2006; Sundberg Reference Sundberg2006; Nelson et al. Reference Nelson, Uwasu and Polasky2007, 2013; Lowry and Scott Krummenacher Reference Lowry and Scott Krummenacher2017; Lang et al. Reference Lang, Prendergast and Pearson-Merkowitz2018; Lowry Reference Lowry2018; Prendergast et al. Reference Prendergast, Pearson-Merkowitz and Lang2019; Pearson-Merkowitz and Lang Reference Pearson-Merkowitz and Lang2020; Lang and Pearson-Merkowitz Reference Lang and Pearson-Merkowitz2022). We use data from the Trust for Public Land’s LandVote database (TPL). The database is a comprehensive listing of state, county, special district, and municipal-level referendums to acquire and/or preserve land since 1988. For each referendum, TPL reports a description of the referendum, jurisdiction, total proposed funding of the ballot measure, total approved funding, proposed conservation-specific funding for land acquisition and protection, approved conservation funding, financing mechanism, election date, vote proportions for and against, as well as descriptive notes. This dataset has two major benefits. First, it is the only comprehensive dataset of bond referendums currently in existence. Second, a large literature exists on the determinants of voting outcomes for open space preservation proposals on state and local ballots that help inform our control variables and expectations (e.g. Heintzelman et al. Reference Heintzelman, Walsh and Grzeskowiak2013; Altonji et al. Reference Altonji, Lang and Puggioni2016; Prendergast et al. Reference Prendergast, Pearson-Merkowitz and Lang2019; Pearson-Merkowitz and Lang Reference Pearson-Merkowitz and Lang2020; Banzhaf et al. Reference Banzhaf, Oates and Sanchirico2010; Kotchen and Powers Reference Kotchen and Powers2006). In the coterminous USA, from 1988 to 2012, 1,031 municipalities held 1,640 referendums to acquire and preserve open spaces. Of the municipalities in our dataset, 351 held more than one referendum. See Tables A1 and A2 for a breakdown of sample referendums by year and by state.

We test our first hypotheses using a RD design, which allows for causal inference (Imbens and Lemieux Reference Imbens and Lemieux2008). Generally, treatment effects are estimated by comparing outcomes for treated units to control units. The problem with this simplistic method is that there are unobserved determinants of outcomes that can bias estimated treatment effects. RD improves inference by effectively comparing observations in a range close to the treatment threshold, that is, observations that are just barely treated or just barely not treated. By comparing observations that are close to the threshold, treatment status can be assumed as good as random. RD exploits this quasi-random treatment assignment to identify the casual effect.

In our application, we compare municipalities that have barely passed versus barely failed a referendum and test for differences in future referendum behavior. We model the number of subsequent referendums following a first referendum as a function the first referendum’s vote margin, which is the running variable. We test for a discontinuity in number of subsequent referendums around a threshold of a zero-vote margin,Footnote ³ representing a referendum that just barely passes or fails.

The first critical assumption of RD is that the potential outcomes of observations within this neighborhood are continuous. Therefore, any discontinuity in outcome across the threshold can be attributed directly to the outcome of the first referendum, instead of other confounding factors that may exist over the entire range of vote margins as would be the case if we employed OLS. We cannot test the assumption of continuous potential outcomes directly because we only observe one voting outcome for each referendum, but we can indirectly assess the assumption by comparing observable characteristics for municipalities that pass or fail. If there is balance between these groups, then our assumption is plausible. We matched municipalities to socioeconomic data in the 2000 USA. Decennial Census and present summary statistics for all municipalities in our dataset (Table 1, Column 1), municipalities that pass at least one referendum (Column 2) and that fail at least one referendum (Column 3), and municipalities that pass and fail with a vote margin within five percent (Columns 5 and 6, respectively), as well as t-statistics for the difference of means (Columns 4 and 7). Municipalities in our dataset have similar socioeconomic characteristics regardless of success or failure at the ballot box, especially those that have vote margins within five percent of passing. These similarities support the use of our RD framework; municipalities that hold referendums with vote margins near the cutoff point are statistically similar in observable characteristics and are likely to be similar in unobserved characteristics as well. In addition, we compare socioeconomic and referendum characteristics using an RD framework, both graphically and using regression (see Figure A1 and Table A4 in the Online Appendix). These analyses showed that socioeconomic and referendum characteristics are generally continuous in vote margin, supporting our assumption that any discontinuity in number of future referendums at the threshold is due to success or failure of a first referendum rather than another factor.

Table 1. Socioeconomic and demographic descriptive statistics

Notes: Socioeconomic and demographic data are from the 2000 U.S. Decennial Census for municipalities that held at least one open space referendum in the coterminous United States 1988-2012 according to the Trust for Public Land’s LandVote database. High school and college are educational attainment variables representing the percent of population that completed those degrees. Income is median household income. Recent construction represents the percent of houses constructed 1990-2000. Standard deviations are shown in parentheses

The second critical assumption of RD designs is that there is no manipulation of the running variable. The fact that many thousands of people vote on each of these referendums suggests that manipulation of the outcome is quite difficult. That being said, we still investigate this possibility rigorously. Figure A2 in the Online Appendix presents a density plot of every sample municipality’s first referendum, which forms the running variable. The data are noisy but do not indicate a clear discontinuity at the threshold. As a second and more formal test, we employ the Cattaneo et al. (Reference Cattaneo, Jansson and Ma2018) test of smoothness of the running variable’s density around the threshold. The p-value for the hypothesis of no discontinuity at the threshold is 0.571, indicating no statistical difference. Thus, this evidence suggests that there is no manipulation of the running variable.

Using a RD framework, Cellini et al. (Reference Cellini, Ferreira and Rothstein2010) find that districts that fail an initial school bond measure are more likely to pass a subsequent measure. If we were to simply model the number of subsequent referendums as a function of success or failure, then our estimates would compare municipalities that fail by a large margin to those that pass with a large margin, which are arguably very different in both observable and unobservable characteristics (likely introducing selection bias). The benefit of RD is that we control for vote margin and estimate only the local differential effect for ostensibly similar municipalities that barely fail or barely pass referendums. In fact, our empirical analysis compares our RD approach to a more traditional cross-sectional approach and finds results differ by an order of magnitude.

We illustrate our null and alternative hypotheses in the context of an RD framework in Figure 1, which shows patterns that may be observed in the data under the various hypotheses. Figure 1 plots the number of future referendums held as a function of vote margin in the first referendum, with the threshold for passage being a vote margin of zero. Our null hypothesis is represented by the graph on the left. We have given the relationship between vote margin and future referendums an intuitive positive slope (though this is not necessary for our research design), which would suggest that voters self-select into municipalities that match their preferences for open space and future referendums reflect these preferences but are not impacted by the outcome of the first referendum. The middle graph represents H1, where municipalities that just barely fail a first referendum are less likely to hold a future referendum relative to those that pass the first referendum. The discontinuous jump in likelihood of holding a subsequent referendum is apparent at the threshold. The right graph represents H2, where municipalities that just barely fail a first referendum are more likely to try again by holding future referendums, while those that pass are less likely to hold future referendums.Footnote ⁴

Figure 1. Intuition behind regression discontinuity design.

Notes: Each graph hypothesizes the number of future referendums held (vertical axis) as a function of vote margin for an initial referendum (horizontal axis). Points to the left of the vertical dashed line represent a failed initial referendum, while those to the right represent a passed first referendum. The left graph represents a scenario with no discontinuity around a zero-vote margin and the upward slope could be interpreted as preference-based sorting. The middle graph represents a scenario where municipalities that pass a referendum are encouraged to hold more in the future, while those that fail a referendum are discouraged from holding future referendums. The right graph represents a scenario where municipalities that just barely fail a referendum are more likely to hold future referendums to try again, while those that just barely pass a referendum are satiated and less likely to hold future referendums.

We generate two dependent variables for estimating temporal dynamics, the number of future referendums held and the number of future referendums passed in each municipality in our dataset. The number of future referendums held following a first referendum i by municipality m within $\tau $ years of a first referendum is defined by:

(1) $$held_{im}^\tau = \left\{ {\matrix{ {\mathop \sum \nolimits_t^{t + \tau } referendum\_hel{d_{mt}}} \cr {missing\;if\;i\;occured\;within\;\tau \;of\;the\;end\;of\;the\;dataset} \cr } } \right.$$

where $referendum\_hel{d_{mt}}$ equals one for each referendum held in municipality m between t and $t + \tau $ . If the entire time frame $\tau $ does not fall within the span of the dataset, we treat $held_{im}^\tau $ as missing. Because our analysis relies on a count of referendums, we discard observations where the first referendum occurs too close to the end of our dataset to have complete data for the number of future referendums. We likewise generate a dependent variable counting the number of referendums that pass within a time frame of the first referendum, $passed_{im}^\tau $ .

We create these variables for time frames $\tau $ of 1, 3, and 5 years. We include these time frames to account for collective local memory of past referendums assuming recent referendums are the more salient than older referendums. Additionally, each time frame may capture towns with different constraints. While some towns may be able to schedule a repeat election within 1 year, others may be financially or constitutionally constrained to the next normal election.Footnote ⁵

For illustration purposes, consider the example of Park Ridge Borough, NJ. Park Ridge held referendums in 2003, 2009, 2010 and 2012. We consider each of these referendums as the first referendum, in turn, and calculate the number of subsequent referendums held. When the 2003 referendum is considered the first referendum, the number of referendums held within 1, 3, and 5 years are all zero since the next referendum held was in 2009, 6 years past the date of the first observed referendum. When 2009 is considered the first referendum, the number of referendums held within 1 year equals 1 because of the 2010 referendum ( $hel_{2009,\;Park\;Ridge}^1 = 1$ ), the number of referendums held within 3 years equals 2 because of the 2010 and 2012 referendums ( $held_{2009,\;Park\;Ridge}^3 = 2$ ), and the number of referendums held within 5 years is not included in the model because the time frame extends past the end of our dataset ( $held_{2009,Park\;Ridge}^5 = missing$ ). In our regression model, each referendum is considered a first referendum and represents one observation.

Using our RD framework, we define the treatment variable to be failing a first referendum and model the number of referendums held (or passed) within $\tau $ years as a function of treatment and control flexibly for vote margin of first referendum i at time t:

(2) $$\eqalign{ & held_{imt}^\tau = {\beta ^\tau } \cdot fai{l_{imt}} + \gamma _1^\tau \cdot fai{l_{imt}} \cdot votemargi{n_{imt}} + \gamma _2^\tau \cdot fai{l_{imt}} \cdot votemargi{n_{imt}}^2 + \cr & \gamma _3^\tau \cdot fai{l_{imt}} \cdot votemargi{n_{imt}}^3 + \gamma _4^\tau \cdot votemargi{n_{imt}} + \gamma _5^\tau \cdot votemargi{n_{imt}}^2 \cr & + \gamma _6^\tau \cdot votemargi{n_{imt}}^3 + {{\boldsymbol{\delta ^\tau }}} \cdot {{\boldsymbol{X_{mt}}}} + \varepsilon _{imt}^\tau \cr}$$

where $held_{im}^\tau $ is defined by equation (1), $fai{l_{im}}$ is a binary variable equal to 1 if the first referendum i in municipality m failed, and ${\beta ^\tau }$ is our variable of interest. We interpret ${\beta ^\tau }$ as the differential number of referendums held within time frame $\tau $ following a fail outcome, ceteris paribus. A negative significant value of ${\beta ^\tau }$ suggests that a municipality that fails a first referendum is likely to hold fewer referendums in the future than a municipality that passes a first referendum. A positive significant value of ${\beta ^\tau }$ suggests that a municipality that fails a first referendum is likely to hold more votes in the future than a municipality that passes. An insignificant value of ${\beta ^\tau }$ indicates that the binary voting outcome has no discernible effect on the number of future referendums. In our preferred model (described in equation 2), we control for the vote margin of the first referendum using a cubic polynomial applied to either side of the threshold for passage. We also report the results from using a quadratic functional form and a local linear specification. We include a vector ${{\boldsymbol{X}}_m}$ of municipality socioeconomic characteristics, state fixed effects, and year fixed effects.Footnote ⁶ Last, $\varepsilon _{imt}^\tau $ is the error term. We use ordinary least squares estimation with robust standard errors clustered at the municipality level. Equally important, we also estimate Equation (2) using $passed_{imt}^\tau $ as the dependent variable.

Revisions

Our second analysis focuses on exploring revisions made to referendum characteristics and their effectiveness. We examine changes made to referendums in municipalities that hold more than one referendum. Our exploration begins with estimating how referendum characteristics change as a function of voting outcomes. Specifically, we look at revisionsFootnote ⁷ between a first referendum and the next subsequent referendum in total proposed funding (logged subsequent total proposed funding per capita minus logged first referendum total proposed funding per capita), percentage point change in proportion of conservation funding to total funding, whether the measure uses a bond as the financing mechanism, and whether the referendum was held in November of a presidential election year (e.g. Guber Reference Guber2003):

(3) $$revision_{im}^\tau = characteristi{c_{i + 1,m}} - characteristi{c_{im}}$$

As with our dependent variables in the referendum dynamics analysis, we use a time frame of 5 years following the first observed referendum. In addition to our reasoning in the temporal dynamics framework, we include this time frame to account for collective local memory and political relevance of past referendums. Only pairs of first and subsequent referendums are included in our sample for this analysis. One argument against this method is that selection bias is likely to exist for those municipalities that decide to hold a subsequent referendum. While this is true, we argue that because we restrict our sample to include only municipalities that held more than one referendum, selection bias is present across all municipalities in this sample, and our coefficient of interest will still have a valuable interpretation with internal validity for municipalities that hold multiple referendums. We use OLS to estimate the model:

(4) $$revision_{imt}^\tau = {\beta ^\tau } \cdot fai{l_{imt}} + {{\boldsymbol{\delta ^\tau }}} \cdot {{\boldsymbol{Z_{mt}}}} + \varepsilon _{imt}^\tau $$

where $revision_{im}^\tau $ is defined in equation (3) and ${{\boldsymbol{Z_{mt}}}}$ is a vector including socioeconomic variables, a binary variable equal to 1 if the municipality is in Massachusetts or New Jersey,Footnote ⁸ and a binary variable equal to 1 if the subsequent referendum was held during the recession 2008–2012.Footnote ⁹ Here, ${\beta ^\tau }$ is again our variable of interest. A significant ${\beta ^\tau }$ indicates a significant difference in each revised characteristic between municipalities that fail versus pass their first referendum, which would suggest that municipalities strategically revise referendums.

Finally, we test whether these revisions are correlated with voter support of subsequent referendums to see if these changes are correlated with a larger vote margin. We model change in vote margin, $votemarginchange_{im}^\tau $ , of the subsequent referendum (within a 5-year time frame) as a function of revisions to referendum characteristics interacted with vote outcome of a first referendum:

(5) $$\eqalign{ votemarginchange_{imt}^5 & = {\alpha ^5} \cdot fai{l_{imt}} + {{\boldsymbol{\gamma ^5}}} \cdot {\boldsymbol{revisions_{imt}^5}} \cr & + \;{{\boldsymbol{\beta ^5}}} \cdot fai{l_{imt}} \cdot {\boldsymbol{revisions_{imt}^5}} + {{\boldsymbol{\delta ^5}}} \cdot {{\boldsymbol{Z_{mt}}}} + \varepsilon _{imt}^5 \cr}$$

Here, ${\boldsymbol{revisions_{imt}^5}}$ is a vector of all four possible revisions as defined above. The interaction of the revisions with $fai{l_{imt}}$ provides information about how the revisions differ by initial referendum outcome. ${{\boldsymbol{Z_{mt}}}}$ is defined as in equation (4).Footnote ¹⁰

In both Equations (4) and (5), we have moved away from the RD framework. The equations also simplify the set of control variables. These are necessary steps given the substantial reduction in sample size caused by focusing on municipalities that hold more than one referendum. However, changing from RD to standard OLS limits the causal interpretation of these results, and instead we encourage a more descriptive interpretation. In addition to estimating both models with the full sample, we also estimate them with a reduced sample of initial referendums within 10 percentage points of the passing threshold to incorporate the RD logic and improve the counterfactual.