Using generalizability theory with continuous latent response variables.

Abstract: In this article, we illustrate ways in which generalizability theory (G-theory) can be used with continuous latent response variables (CLRVs) to address problems of scale coarseness resulting from categorization errors caused by representing ranges of continuous variables by discrete data points and transformation errors caused by unequal interval widths between those data points. The mechanism to address these problems is applying structural equation modeling (SEM) as a tool in deriving variance components ne… Show more

“…The remainder of this section describes the methods to specify CFAs for data from one-facet, two-nested-facet, and two-crossed-facet G-studies (these map onto the first three examples presented by [17] in their online supplementary materials), which include an appropriately constrained mean structure to represent main and interaction effects involving facets of generalization. I then discretize the example data and illustrate (a) how to model the mean structure with ordinal measurements, (b) how to obtain G-and D-coefs on the LRV scale, and (c) how to use existing software to obtain a G-coef on the ordinal response scale (see Section 5.3).…”

“…When cut = µ, Equation (5) reduces to the global D-coef (Equation ( 4)) and takes its lowest value, so I only present cut-score equations in later sections. Plots can illustrate how D-coefs vary across a range of cut-scores [16,17].…”

“…Marcoulides [14] proposed specifying a GT design as a structural equation model [SEM]; see also [15] to estimate GT variance components-an idea recently revisited by Vispoel et al [16], who also extended the idea to SEM with ordinal variables [17]. Applications of SEM to GT have so far focused only on obtaining a generalizability coefficient (G-coef), which is defined using only relative error.…”

“…Using the open-source R [20] package lavaan [21], I demonstrate with simulated data how to specify appropriate constraints on the mean structure of a confirmatory factor analysis (CFA) model to represent the remaining facets necessary for absolute error in designs with one and two (crossed and nested) facets. Whereas [14,15,17] calculated point estimates of G-and D-coefs after fitting the model, I demonstrate how to define them as new parameters in lavaan's model syntax, thus additionally obtaining a delta-method standard error (SE) and normal-theory confidence interval (CI) for G-and D-coefs. Because the delta method relies on asymptotic theory, it can yield poor coverage and inflated Type I errors in small or modest samples.…”

“…Thus, I also demonstrate how to obtain Monte Carlo CIs, which is a more robust method because it only assumes the estimated parameters (not complex functions of parameters) have normal sampling distributions [22]. For ordinal data-for which G-coefs have been defined on a latent-response metric [17,18]-I show how the same mean-structure constraints can be specified in combination with appropriate constraints on thresholds. I use a real-data example to demonstrate some limiting conditions under which SEM becomes infeasible for estimating GT variance components, in which case a mixed-effects modeling framework would be more promising.…”

How to Estimate Absolute-Error Components in Structural Equation Models of Generalizability Theory

“…The remainder of this section describes the methods to specify CFAs for data from one-facet, two-nested-facet, and two-crossed-facet G-studies (these map onto the first three examples presented by [17] in their online supplementary materials), which include an appropriately constrained mean structure to represent main and interaction effects involving facets of generalization. I then discretize the example data and illustrate (a) how to model the mean structure with ordinal measurements, (b) how to obtain G-and D-coefs on the LRV scale, and (c) how to use existing software to obtain a G-coef on the ordinal response scale (see Section 5.3).…”

“…When cut = µ, Equation (5) reduces to the global D-coef (Equation ( 4)) and takes its lowest value, so I only present cut-score equations in later sections. Plots can illustrate how D-coefs vary across a range of cut-scores [16,17].…”

“…Marcoulides [14] proposed specifying a GT design as a structural equation model [SEM]; see also [15] to estimate GT variance components-an idea recently revisited by Vispoel et al [16], who also extended the idea to SEM with ordinal variables [17]. Applications of SEM to GT have so far focused only on obtaining a generalizability coefficient (G-coef), which is defined using only relative error.…”

“…Using the open-source R [20] package lavaan [21], I demonstrate with simulated data how to specify appropriate constraints on the mean structure of a confirmatory factor analysis (CFA) model to represent the remaining facets necessary for absolute error in designs with one and two (crossed and nested) facets. Whereas [14,15,17] calculated point estimates of G-and D-coefs after fitting the model, I demonstrate how to define them as new parameters in lavaan's model syntax, thus additionally obtaining a delta-method standard error (SE) and normal-theory confidence interval (CI) for G-and D-coefs. Because the delta method relies on asymptotic theory, it can yield poor coverage and inflated Type I errors in small or modest samples.…”

“…Thus, I also demonstrate how to obtain Monte Carlo CIs, which is a more robust method because it only assumes the estimated parameters (not complex functions of parameters) have normal sampling distributions [22]. For ordinal data-for which G-coefs have been defined on a latent-response metric [17,18]-I show how the same mean-structure constraints can be specified in combination with appropriate constraints on thresholds. I use a real-data example to demonstrate some limiting conditions under which SEM becomes infeasible for estimating GT variance components, in which case a mixed-effects modeling framework would be more promising.…”

How to Estimate Absolute-Error Components in Structural Equation Models of Generalizability Theory

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Klassische Testtheorie (KTT)