Investigating the Performance of Exploratory Graph Analysis and Traditional Techniques to Identify the Number of Latent Factors: A Simulation and Tutorial

Overview

Journal Psychol Methods

Publisher American Psychological Association

Specialty Psychology

Date 2020 Mar 20

PMID 32191105

Citations 95

Authors

Hudson Golino

Dingjing Shi

Alexander P Christensen

Luis Eduardo Garrido

Maria Dolores Nieto

Ritu Sadana

Jotheeswaran Amuthavalli Thiyagarajan

Agustin Martinez-Molina

Affiliations

Soon will be listed here.

Abstract

Exploratory graph analysis (EGA) is a new technique that was recently proposed within the framework of network psychometrics to estimate the number of factors underlying multivariate data. Unlike other methods, EGA produces a visual guide-network plot-that not only indicates the number of dimensions to retain, but also which items cluster together and their level of association. Although previous studies have found EGA to be superior to traditional methods, they are limited in the conditions considered. These issues are addressed through an extensive simulation study that incorporates a wide range of plausible structures that may be found in practice, including continuous and dichotomous data, and unidimensional and multidimensional structures. Additionally, two new EGA techniques are presented: one that extends EGA to also deal with unidimensional structures, and the other based on the triangulated maximally filtered graph approach (EGAtmfg). Both EGA techniques are compared with 5 widely used factor analytic techniques. Overall, EGA and EGAtmfg are found to perform as well as the most accurate traditional method, parallel analysis, and to produce the best large-sample properties of all the methods evaluated. To facilitate the use and application of EGA, we present a straightforward R tutorial on how to apply and interpret EGA, using scores from a well-known psychological instrument: the Marlowe-Crowne Social Desirability Scale. (PsycInfo Database Record (c) 2020 APA, all rights reserved).

Citing Articles

An exploratory network analysis to investigate schizotypy's structure using the 'Multidimensional Schizotypy Scale' and 'Oxford-Liverpool Inventory' in a healthy cohort.

Sarti P, Surbeck W, Cecere G, Dannecker N, Horisberger R, Kallen N Schizophrenia (Heidelb). 2025; 11(1):34.

PMID: 40021721 PMC: 11871301. DOI: 10.1038/s41537-025-00584-3.

A network perspective on cognition in individuals with Parkinson's disease.

Scharfenberg D, Kalbe E, Balzer-Geldsetzer M, Berg D, Hilker-Roggendorf R, Kassubek J Alzheimers Dement (Amst). 2025; 17(1):e70091.

PMID: 39996032 PMC: 11848640. DOI: 10.1002/dad2.70091.

Network analysis of meaning in life, perceived social support, and depressive symptoms among vocational undergraduate students.

Zhang S, Zhang W, Yong S, Chen J Front Psychiatry. 2025; 16:1510255.

PMID: 39967583 PMC: 11832497. DOI: 10.3389/fpsyt.2025.1510255.

Psychometric network analysis of the Multidimensional Assessment of Interoceptive Awareness, version 2 (MAIA-2) in Peruvian adults.

Vivas-Rivas L, Serpa-Barrientos A, Galvez-Diaz N, Carranza-Cubas S, Saintila J BMC Psychol. 2025; 13(1):125.

PMID: 39955565 PMC: 11829528. DOI: 10.1186/s40359-025-02480-y.

Psychological, psychiatric, and behavioral sciences measurement scales: best practice guidelines for their development and validation.

Stefana A, Damiani S, Granziol U, Provenzani U, Solmi M, Youngstrom E Front Psychol. 2025; 15:1494261.

PMID: 39916786 PMC: 11798685. DOI: 10.3389/fpsyg.2024.1494261.

References

Garrido L, Abad F, Ponsoda V . Are fit indices really fit to estimate the number of factors with categorical variables? Some cautionary findings via Monte Carlo simulation. Psychol Methods. 2015; 21(1):93-111. DOI: 10.1037/met0000064. View

Timmerman M, Lorenzo-Seva U . Dimensionality assessment of ordered polytomous items with parallel analysis. Psychol Methods. 2011; 16(2):209-20. DOI: 10.1037/a0023353. View

Lubbe D . Parallel analysis with categorical variables: Impact of category probability proportions on dimensionality assessment accuracy. Psychol Methods. 2018; 24(3):339-351. DOI: 10.1037/met0000171. View

Gates K, Henry T, Steinley D, Fair D . A Monte Carlo Evaluation of Weighted Community Detection Algorithms. Front Neuroinform. 2016; 10:45. PMC: 5102890. DOI: 10.3389/fninf.2016.00045. View

Song W, Matteo T, Aste T . Hierarchical information clustering by means of topologically embedded graphs. PLoS One. 2012; 7(3):e31929. PMC: 3302882. DOI: 10.1371/journal.pone.0031929. View

Barfuss W, Massara G, Matteo T, Aste T . Parsimonious modeling with information filtering networks. Phys Rev E. 2017; 94(6-1):062306. DOI: 10.1103/PhysRevE.94.062306. View

Garcia-Garzon E, Abad F, Garrido L . Searching for G: A New Evaluation of SPM-LS Dimensionality. J Intell. 2019; 7(3). PMC: 6789834. DOI: 10.3390/jintelligence7030014. View

Izquierdo I, Olea J, Abad F . Exploratory factor analysis in validation studies: uses and recommendations. Psicothema. 2014; 26(3):395-400. DOI: 10.7334/psicothema2013.349. View

Auerswald M, Moshagen M . How to determine the number of factors to retain in exploratory factor analysis: A comparison of extraction methods under realistic conditions. Psychol Methods. 2019; 24(4):468-491. DOI: 10.1037/met0000200. View

10.

Li C . Confirmatory factor analysis with ordinal data: Comparing robust maximum likelihood and diagonally weighted least squares. Behav Res Methods. 2015; 48(3):936-49. DOI: 10.3758/s13428-015-0619-7. View

11.

Epskamp S, Rhemtulla M, Borsboom D . Generalized Network Psychometrics: Combining Network and Latent Variable Models. Psychometrika. 2017; 82(4):904-927. DOI: 10.1007/s11336-017-9557-x. View

12.

Epskamp S, Fried E . A tutorial on regularized partial correlation networks. Psychol Methods. 2018; 23(4):617-634. DOI: 10.1037/met0000167. View

13.

Widaman K . Common Factor Analysis Versus Principal Component Analysis: Differential Bias in Representing Model Parameters?. Multivariate Behav Res. 2016; 28(3):263-311. DOI: 10.1207/s15327906mbr2803_1. View

14.

Epskamp S, Waldorp L, Mottus R, Borsboom D . The Gaussian Graphical Model in Cross-Sectional and Time-Series Data. Multivariate Behav Res. 2018; 53(4):453-480. DOI: 10.1080/00273171.2018.1454823. View

15.

Kane M, Hambrick D, Conway A . Working memory capacity and fluid intelligence are strongly related constructs: comment on Ackerman, Beier, and Boyle (2005). Psychol Bull. 2005; 131(1):66-71. DOI: 10.1037/0033-2909.131.1.66. View

16.

Lim S, Jahng S . Determining the number of factors using parallel analysis and its recent variants. Psychol Methods. 2019; 24(4):452-467. DOI: 10.1037/met0000230. View

17.

Sass D, Schmitt T . A Comparative Investigation of Rotation Criteria Within Exploratory Factor Analysis. Multivariate Behav Res. 2016; 45(1):73-103. DOI: 10.1080/00273170903504810. View

18.

Friedman J, Hastie T, Tibshirani R . Sparse inverse covariance estimation with the graphical lasso. Biostatistics. 2007; 9(3):432-41. PMC: 3019769. DOI: 10.1093/biostatistics/kxm045. View

19.

Williams D, Rast P . Back to the basics: Rethinking partial correlation network methodology. Br J Math Stat Psychol. 2019; 73(2):187-212. PMC: 8572131. DOI: 10.1111/bmsp.12173. View

20.

Braeken J, van Assen M . An empirical Kaiser criterion. Psychol Methods. 2016; 22(3):450-466. DOI: 10.1037/met0000074. View