Model specification

To study emergent variables, the composite model can be used (Henseler & Schuberth, Reference Henseler and Schuberth2020). At the heart of the composite model is an emergent variable and not a latent variable. First and foremost, an emergent variable is a weighted linear combination of elements, i.e., it is a composite. Hence, the composite model assumes that the construct is fully defined by its elements. Consequently, an emergent variable is not assumed to exist independent of its elements. This contrasts with the latent variable in the common factor model, which is measured and therefore assumed to exist independent of its measures (Borsboom et al., Reference Borsboom, Mellenbergh and Van Heerden2004). However, as Henseler and Schuberth (Reference Henseler and Schuberth2023) noted, if the elements exit, so does the emergent variable. Since each element plays a constituent role in forming the construct, omitting an element will alter the construct’s meaning in the composite model. An additional and important property of an emergent variable is that it accounts for the covariances between its elements and other variables in the model. This property is expressed by the axiom of unity (Henseler & Schuberth, Reference Henseler, Schuberth and Henseler2021a). Thus, an emergent variable conveys all the information shared between its elements and other variables of the model (Dijkstra, Reference Dijkstra2013; Reference Dijkstra, Latan and Noonan2017). Hence, an emergent variable acts as a whole and not as a mere loose collection of elements (Henseler & Schuberth, Reference Henseler, Schuberth and Henseler2021b). Table 1 summarizes the characteristics of the composite model. Note that composites are usually depicted by hexagons (e.g., Grace & Bollen, Reference Grace and Bollen2008). However, most SEM software packages with a graphical interface have not implemented this graphical representation yet.

Initially, the proposition was to express emergent variables in CCA by means of weights because this is highly intuitive (Schuberth et al., Reference Schuberth, Henseler and Dijkstra2018). However, this prevents a researcher from conducting CCA in SEM, limiting its ability to benefit from SEM’s advantages, such as obtaining fit measures and dealing with missing values (Schuberth, Reference Schuberth2023). This is because an emergent variable will always be modeled as a dependent variable. For this reason, it is not possible to specify covariances between an emergent variable and other variables, which is an essential requirement for conducting CCA. Therefore, taking such an approach, researchers could only specify covariances between the emergent variable’s disturbance term and other variables in the model. However, since an emergent variable is assumed to be fully determined by its elements, the variance of this disturbance term must be constrained to zero. Besides the fact that covariances with a constrained disturbance term cannot be specified, this clearly contradicts specifying covariances between emergent variables.

To overcome this limitation, in this study, we use the H–O specification (Henseler & Schuberth, Reference Henseler, Schuberth and Henseler2021b; Schuberth, Reference Schuberth2023), in particular its refined version (Yu et al., Reference Yu, Schuberth and Henseler2023). In the H–O specification, not only a single composite, but as many composites as elements are formed from a set of elements, i.e., one emergent and several excrescent variables. The emergent variable depicts the construct of interest, whereas the excrescent variables have no further meaning. They are merely formed to span the space of the elements together with the emergent variable. This approach resembles a principal component analysis (Hotelling, Reference Hotelling1933) in which as many principal components as variables are extracted. For a more technical description, we refer the reader to Schuberth (Reference Schuberth2023) and Schamberger et al. (Reference Schamberger, Schuberth and Henseler2023).

Figure 1 presents an example of the H–O specification in the SEM software Amos. In this example, the emergent variable is formed by five elements; consequently, four excrescent variables (ex1 to ex4) are specified. Notably, the elements are assumed to be free from random measurement error. Moreover, the emergent variable must be connected to at least one other variable of the model as indicated by the double-headed arrow, as we will elaborate in the next subsection about model identification. This additionally highlights that emergent variables are context-specific, i.e., their meaning also depends on the model’s other variables (Yu et al., Reference Yu, Zaza, Schuberth and Henseler2021). Since Amos software does not allow for drawing hexagons, the emergent and excrescent variables are displayed as ovals in Figure 1.

Figure 1. Example of an H–O specification to conduct CCA.

Note: ex=excrescent variable.

To facilitate the application of CCA in the R environment (R Core Team, 2022) using the lavaan package (Rosseel, Reference Rosseel2012), the R function specifyHO can be used.Footnote ¹ In doing so, the user must specify the model’s emergent variables in lavaan syntax using the ‘<∼’ operator. Subsequently, this model can be applied to the specifyHO function to obtain lavaan model syntax in which emergent variables are specified in compliance with the H–O specification. Subsequently, this obtained model syntax can be used as input for the sem function of the lavaan package to conduct CCA.

Model identification

To ensure that the model parameters are identified, constraints must be imposed on the parameters. This involves determining the variances of the emergent and excrescent variables. For this purpose, we set one composite loading for each emergent and excrescent variable to one. In this regard, no element can serve as a scaling variable more than once. In our example model, depicted in Figure 1, each element is used only once as scaling indicator, i.e., only one of its composite loadings is constrained to 1. For example, the composite loading of Element 1 on the emergent variable is constrained to 1. Similarly, Element 2 shows that a composite loading on the excrescent variable ex1 is constrained to 1. Further, the emergent variable must be uncorrelated with the excrescent variables, in this case ex1 to ex4. Also, the emergent variable must be related to at least one other variable in the model other than its elements, e.g., to another observed, latent, or emergent variable in the model. In our illustrative model, this is indicated by the double-headed arrow. In contrast, the excrescent variables are only allowed to correlate with one another, as Figure 1 shows. Consequently, the emergent variable fully accounts for the covariances between the elements and other variables in the model. In other words, all information between the elements and other variables in the model is conveyed by the emergent variable (Dijkstra, Reference Dijkstra, Latan and Noonan2017). Further, one needs to ensure that the excrescent variables span the remaining space of the elements that is not spanned by the emergent variable (Schuberth, Reference Schuberth2023). To this end, we fix all composite loadings of each excrescent variable to zero except for two, namely the composite loading that is fixed to one to determine the excrescent variable’s variance and one composite loading that is freely estimated. For example, in Figure 1, the composite loading of Element 1 on the first excrescent variable ex1 is a free model parameter, whereas all other composite loadings on that excrescent variable are constrained to 1 or 0. The composite loadings of the other excrescent variables are fixed in similar fashion. In fixing the composite loadings of the excrescent variables, it must be ensured that no excrescent variables are connected to the exact same elements. Finally, by default, most SEM software applications specify random measurement errors connected to the elements. In this case, the variances of these error terms must be constrained to zero.

Model estimation

Once identification of the model parameters has been ensured, they can be estimated. The H–O specification allows us to draw on different kinds of SEM estimators such as maximum-likelihood (ML) (Jöreskog, Reference Jöreskog1970) or generalized least squares (GLS) (Browne, Reference Browne1974). As a result, researchers applying CCA can gain all the benefits that they are accustomed to having with SEM, e.g., fixing parameters and gaining access to well-established model fit indices (Kline, Reference Kline2015, Chapter 12).

A supposed disadvantage of the H–O specification is that weight estimates are not obtained by default because the relationships between the emergent and excrescent variables and their components are expressed by composite loadings instead of weights. However, as shown in Schuberth (Reference Schuberth2023) and Schamberger et al. (Reference Schamberger, Schuberth and Henseler2023), the weight estimates can be retrieved from the inverted composite loading matrix. As most SEM software applications allow users to specify new parameters, this feature can be exploited to obtain the (standardized) weight estimates. For an explanation of how the weights can be obtained from the composite loadings, we refer the reader to Schuberth (Reference Schuberth2023) and Yu et al. (Reference Yu, Schuberth and Henseler2023). Further, the specifyHO function offers the option of determining weights.

Model assessment

In CCA’s final step, the model is assessed, and its parameter estimates are interpreted. This involves assessing the overall model fit and assessing the emergent variables (Henseler & Schuberth, Reference Henseler and Schuberth2020; Schuberth et al., Reference Schuberth, Henseler and Dijkstra2018). As in CFA, overall model assessment is crucial in CCA and typically involves considering the outcomes of the exact model fit test and various fit indices. If the estimated model’s fit is found to be unacceptable, then the elements forming the emergent variable probably act not as a new whole, but rather as merely a loose collection of parts. Consequently, researchers are urged to consider the elements individually or to modify their models.

To assess overall model fit in CCA, researchers can, in principle, draw on all that is known through CFA and SEM. This includes the chi-square test to assess the exact overall model fit (Jöreskog, Reference Jöreskog1967). However, because testing the exact overall model fit has been criticized as unrealistic (e.g., Bollen, Reference Bollen1989, Chapter 7), various fit indices have been proposed to gauge model fit. These include the standardized root mean square residual (SRMR; Bentler, Reference Bentler1995), the comparative fit index (CFI; Bentler, Reference Bentler1990), the Tucker-Lewis index (TLI; Tucker & Lewis, Reference Tucker and Lewis1973), and the root mean square error approximation (RMSEA; Steiger, Reference Steiger2016). Although existing studies have indicated that fit indices can detect misspecified composite models (Schuberth et al., Reference Schuberth, Henseler and Dijkstra2018; Reference Schuberth, Rademaker and Henseler2022), future research still has to reassess their cut-off values for composite models.

Besides the overall model fit assessment, parameter estimates should be investigated. In this context, the composite loading and weight estimates are of particular interest. The emergent variables’ composite loadings are the covariances between an element and the corresponding emergent variable. Therefore, they show an element’s absolute contribution to the emergent variable (Cenfetelli & Bassellier, Reference Cenfetelli and Bassellier2009). Further, the composite loadings provide information on the orientation of an emergent variable. Specifically, the scaling indicator, i.e., the element whose loading was constrained to 1, determines the orientation of the emergent variable. If it eventually appears that the other elements forming the particular emergent variable show negative composite loadings—even if they are expected to correlate positively with that emergent variable—the researcher should either reconsider the scaling variable or fix the loading of the scaling variable to -1 instead of 1, to ensure the correct orientation of the emergent variable. In addition, the magnitude and significance of the composite loading estimates should be assessed, e.g., by considering the outcome of the z-test or confidence intervals. Furthermore, researchers who are interested in the composition of an emergent variable or want to calculate emergent variables’ scores should consider the weight estimates. Note that weight estimates are affected by multicollinearity, i.e., correlations among the elements, which can lead to differences in the signs of the composite loading and weight estimates. Finally, researchers should take criterion validity into account by considering concurrent and/or predictive validity (e.g., Piedmont, Reference Piedmont and Michalos2014). This is done by examining the extent to which an emergent variable correlates with a criterion variable.

Against the description above, we emphasize that CCA is not a replacement for CFA. While CFA is based on the common factor model to empirically validate latent variables and their measures, CCA is based on the composite model to empirically validate emergent variables and their elements. Consequently, the two techniques make different assumptions about the type of construct and serve different purposes. Therefore, their parameter estimates should not be compared as they have different conceptual meanings.

Model specification

As explained in the previous section, the use of a strategy class can be considered an emergent variable. Considering the items of the MARSI-R, we argue that the various items determine the use of the three strategy classes, i.e., they define the three constructs instead of measuring them. Consequently, removing an item would most likely alter the meaning of the constructs. Therefore, we employed the composite model and CCA to empirically validate the use of the three strategy classes, namely GRS, PSS, and SRS. The use of each strategy class was modeled as an emergent variable composed of the corresponding five items from the MARSI-R. Additionally, we added the READ variable to assess criterion validity. Figure 2 shows the specified model. To guide practitioners using SEM software with a graphical interface, this figure presents the specification in Amos (Arbuckle, Reference Arbuckle2020). To specify the model in lavaan, researchers can use the user-written R function specifyHO.

Figure 2. The CCA model specification used in the illustrative example.

Note: The figure shows the model specification in Amos.

Model identification

To ensure that the parameters are identified, we have employed the rules presented in the previous section. As Figure 2 shows, the composite loadings were constrained appropriately, and each item served only once as scaling indicator. Further, the excrescent variables were correlated only with the excrescent variables of their block and not with other variables in the model. Finally, each emergent variable was connected to at least one other variable besides its elements. In our case, the three emergent variables, i.e., GRS, PSS, and SRS, and the READ variable were allowed to covary.

Model estimation

The items of the dataset showed a mild degree of non-normality, i.e., skewness ranging from -1.57 to 0.13 and excess kurtosis ranging from -1.34 to 1.40. To account for the non-normality in the items, we used the maximum likelihood estimator with robust standard errors to estimate the model parameters, including a Satorra-Bentler scaled test statistic (MLM; Satorra & Bentler, Reference Satorra, Bentler, von Eye and Clogg1994) as implemented in the R package lavaan. The model estimation terminated normally.

Model assessment

To assess the model, we followed our guidelines as given in Table 2. In doing so, we considered the overall model fit. The chi-square test rejected the null hypothesis of exact fit (χ² = 156.97, df = 72, p < 0.01). As a supplement, we considered various indices to judge model fit. The SRMR equaled 0.042, indicating a good model fit. Similarly, the robust RMSEA equaled 0.051, with a 90% confidence interval ranging from 0.040 to 0.062, thus also indicating a good model fit. Finally, the robust CFI and TLI equaled 0.934 and 0.891, respectively. As a result, we regarded the fit of the composite model to be acceptable.

Table 3 shows the standardized weight estimates, including their 95% confidence intervals. As this table demonstrates, all standardized weights were positive, i.e., all the elements contributed positively to forming their corresponding construct. Regarding the confidence intervals of the standardized weights, none contained zero except the standardized weight of PSS1, which indicates that PSS1 did not contribute significantly to PSS. However, following the guidelines in Table 2, in the next step we inspected the estimated standardized composite loadings. Results revealed that the standardized composite loading of PSS1 on PSS was both sizable and significant. Thus, we decided to keep PSS1 in order not to risk altering the meaning of the emergent variable PSS (Benitez et al., Reference Benitez, Henseler, Castillo and Schuberth2020). Similarly, all other elements showed a positive and significant composite loading with their corresponding emergent variable. In addition, we report the correlations among the three emergent variables of GRS, PSS, and SRS which were within a reasonable range, i.e., r (PSS, GRS) = 0.571 (95% CI [0.509, 0.633]), r (GRS, SRS) = 0.576 (95% CI [0.513, 0.639]), and r (PSS, SRS) = 0.568 (95% CI [0.504, 0.632]).

Table 3. CCA results

Note: λ^std = standardized composite loadings. $ w $ ^std = standardized composite weights

Finally, we examined the criterion validity of the emergent variables by considering the extent to which the three emergent variables GRS, PSS, and SRS correlated with students’ self-perception of their reading level (READ). From a theoretical point of view, this measure was expected to be correlated positively with GRS, PSS, and SRS (e.g., Mokhtari et al., Reference Mokhtari, Dimitrov and Reichard2018). With respect to our results, correlations between READ and GRS, PSS, and SRS were all positive and significant: r (READ, GRS) = 0.337 (95% CI [0.257, 0.418]), r (READ, PSS) = 0.328 (95% CI [0.254, 0.403]), and r (READ, SRS) = 0.247 (95% CI [0.164; 0.330]). Consequently, we find no violation of criterion validity. Overall, our results are in line with our hypothesis that GRS, PSS, and SRS behave as emergent variables.