1 Data

The PEI datasetFootnote ¹ asks experts, since 2013, to evaluate whether national elections all around the world can be considered free and fair.Footnote ² It has 49 questions capturing eleven dimensions of electoral integrity. With the exception of North Africa ( $n=41$ ), all regions have at least 100 expert respondents.Footnote ³ The dimensions of electoral integrity are: 1. Electoral Laws (3 questions); 2. Electoral Procedures (4); 3. Boundaries for Voting Districts (3); 4. Voter Registration (3); 5. Party and Candidate Registration (5); 6. Media Coverage (5); 7. Campaign Finance (5); 8. Voting Process (8); 9. Vote Count (5); 10. Voting Results (4); 11. Election Authorities (4). Responses have a 1–5 Likert scale, from “Strongly disagree” to “Strongly agree.” For example, on “Election Authorities,” the first indicator reads “The election authorities were impartial.”Footnote ⁴

2 Measurement Invariance

With Likert scales, MI is obtained if two respondents who have the same level of a latent construct give the same answer to a question measuring it, regardless of group membership (Millsap Reference Millsap2011).Footnote ⁵ We test two types of invariance: metric and scalar (Millsap Reference Millsap2011). Metric invariance means that an increase of 1 unit in the latent trait corresponds to the exact same increase in the response for any individual, regardless of group identity. It yields comparable coefficients when used in regression analysis. Scalar invariance requires, on top of metric, that two individuals with the same level of the construct would give the exact same answer. Scalar invariance is more demanding, but necessary for comparison of group means.

We test MI using multigroup confirmatory factor analysis (MGCFA, Jöreskog Reference Jöreskog1971). In a CFA model, indicators theorized to measure each dimension should load together into a single latent variable. MGCFA considers that observations might be nested into qualitatively different groups. It allows researchers to test if some estimated model parameters differ across the groups: for example, a factor loading may have one value for respondents from region A and another for B, while other model parameters are estimated as the same across all regions. If the measurement instrument is invariant across groups, freely estimated loadings should be similar: if the loading of an indicator is high for one region but low for another, it suggests that the items function differently. We apply MGCFA with three nested invariance models: configural, metric (factor loadings are constrained to be equal across groups) and scalar (loadings and intercepts are constrained to be equal across groups), testing invariance by comparing the $\unicode[STIX]{x1D712}^{2}$ -distributed difference in the -2*log-likelihoods.

The $\unicode[STIX]{x1D712}^{2}$ invariance test in MGCFA has been criticized for finding noninvariance even in the presence of substantively minor deviations (Oberski Reference Oberski2014). Therefore, we also present the Root Mean Squared Error of Approximation (RMSEA), and the Comparative Fit Index (CFI). These are less sensitive to large samples and indicate whether the more restricted models have acceptable fit. Next we use the Alignment method (Asparouhov and Muthén Reference Asparouhov and Muthén2014). This is an optimization approach to invariance which minimizes overall noninvariance of the model while allowing noninvariance of a few indicators or groups (Asparouhov and Muthén Reference Asparouhov and Muthén2014). While these may increase the odds of Type II errors (not finding noninvariance that exists), combining both methods gives us a good overview of actual (non)invariance levels.Footnote ⁶

We test MI in each of the eleven electoral integrity dimensions, each modeled as a latent variable with three to eight indicators as denoted in the codebook. Invariance is tested across two clustering options: five continents, or nine regions (defined by PEI itself). Instead of using the original responses, we run the analyses on DIF-corrected rank ordered responses obtained with PEI’s anchoring vignettes, following the nonparametric model by King et al. (Reference King, Murray, Salomon and Tandon2004).Footnote ⁷

Table 1. MGCFA test of measurement invariance.

$\unicode[STIX]{x1D6E5}\unicode[STIX]{x1D712}^{2}$ : difference between the configural and metric invariance models’ $\unicode[STIX]{x1D712}^{2}$ statistics; $df$ : difference in the number of free parameters between the two models, and $p$ -values for this difference. RMSEA and CFI from the metric invariance models; $\unicode[STIX]{x1D6E5}$ RMSEA and $\unicode[STIX]{x1D6E5}$ CFI are the difference in RMSEA and CFI from that model to the configural. All fit statistics are calculated with the Satorra and Bentler (Reference Satorra and Bentler2001) correction for robust estimation.