Semi‐parametric proportional hazards models with crossed random effects for psychometric response times

Loeys, Tom; Legrand, Catherine; Schettino, Antonio

doi:10.1111/bmsp.12020

Cited by 17 publications

(22 citation statements)

References 53 publications

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“…We adopted a categorized response time model as it is a relatively easy and effective method. However, we note that other semi‐parametric possibilities exist, including the proportional hazards model (Kang, ; Loeys et al ., ; Ranger & Ortner, , ; Wang, Fan, et al ., ) and the linear transformation model (Wang, Chang, et al ., ). An advantage of adopting these models over our model is that they do not rely on arbitrary decision about the number of thresholds Z and the position of the thresholds b zi .…”

Section: Discussionmentioning

confidence: 97%

“…A key characteristic of this framework is that the responses and response times are independent, conditional on the underlying latent speed and latent ability variables. Various instances and extensions of the general approach have been developed since then, including, for instance, multilevel models (Klein Entink, Fox, & van Der Linden, ), models for different distributions of the response times (Klein Entink, van Der Linden, & Fox, ; Loeys, Legrand, Schettino, & Pourtois, ; Ranger & Kuhn, ; Ranger & Ortner, , ; Wang, Chang, & Douglas, ; Wang, Fan, Chang, & Douglas, ), and models for personality data (Ferrando & Lorenzo‐Seva, ,b). Also, some of the earlier approaches (e.g., Roskam, ; Thissen, ) are special cases.…”

Section: Introductionmentioning

confidence: 99%

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A semi‐parametric within‐subject mixture approach to the analyses of responses and response times

Molenaar

Bolsinova

Vermunt

2017

Brit J Math & Statis

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In item response theory, modelling the item response times in addition to the item responses may improve the detection of possible between- and within-subject differences in the process that resulted in the responses. For instance, if respondents rely on rapid guessing on some items but not on all, the joint distribution of the responses and response times will be a multivariate within-subject mixture distribution. Suitable parametric methods to detect these within-subject differences have been proposed. In these approaches, a distribution needs to be assumed for the within-class response times. In this paper, it is demonstrated that these parametric within-subject approaches may produce false positives and biased parameter estimates if the assumption concerning the response time distribution is violated. A semi-parametric approach is proposed which resorts to categorized response times. This approach is shown to hardly produce false positives and parameter bias. In addition, the semi-parametric approach results in approximately the same power as the parametric approach.

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Section: Discussionmentioning

confidence: 97%

Section: Introductionmentioning

confidence: 99%

A semi‐parametric within‐subject mixture approach to the analyses of responses and response times

Molenaar

Bolsinova

Vermunt

2017

Brit J Math & Statis

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“…This measurement model is subsequently connected to the measurement model for the responses. For example, the person and item parameters from both measurement models can be considered as random variables that have a common multivariate normal distribution across the models (Glas and van der Linden, 2010;Klein Entink, Fox, & van der Linden, 2009;Loeys, Legrand, Schettino, & Pourtois, 2014;, 2009a. Other researchers have simplified this model by only assuming a common distribution for the speed and ability variables (Molenaar, Tuerlinckx, & Van der Maas, 2015a;Ranger & Ortner, 2012;Wang, Fan, Chang, and Douglas, 2013).…”

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confidence: 99%

Hidden Markov Item Response Theory Models for Responses and Response Times

Molenaar

Oberski

Vermunt

et al. 2016

Multivariate Behavioral Research

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Current approaches to model responses and response times to psychometric tests solely focus on between-subject differences in speed and ability. Within subjects, speed and ability are assumed to be constants. Violations of this assumption are generally absorbed in the residual of the model. As a result, within-subject departures from the between-subject speed and ability level remain undetected. These departures may be of interest to the researcher as they reflect differences in the response processes adopted on the items of a test. In this article, we propose a dynamic approach for responses and response times based on hidden Markov modeling to account for within-subject differences in responses and response times. A simulation study is conducted to demonstrate acceptable parameter recovery and acceptable performance of various fit indices in distinguishing between different models. In addition, both a confirmatory and an exploratory application are presented to demonstrate the practical value of the modeling approach.

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“…Arguably the most popular approach to the analysis of responses and response times is the so-called hierarchical model of Van der Linden [32,33] (see also [34][35][36][37][38]). In this approach, first, a measurement model is specified for the responses.…”

Section: Item Response Theory Modeling Of Response Timesmentioning

confidence: 99%

Response Mixture Modeling of Intraindividual Differences in Responses and Response Times to the Hungarian WISC-IV Block Design Test

et al. 2016

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Response times may constitute an important additional source of information about cognitive ability as it enables to distinguishing between different intraindividual response processes. In this paper, we present a method to disentangle interindividual variation from intraindividual variation in the responses and response times of 978 subjects to the 14 items of the Hungarian WISC-IV Block Design test. It is found that faster and slower responses differ in their measurement properties suggesting that there are intraindivual differences in the response processes adopted by the subjects.

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Semi‐parametric proportional hazards models with crossed random effects for psychometric response times

Cited by 17 publications

References 53 publications

A semi‐parametric within‐subject mixture approach to the analyses of responses and response times

A semi‐parametric within‐subject mixture approach to the analyses of responses and response times

Hidden Markov Item Response Theory Models for Responses and Response Times

Response Mixture Modeling of Intraindividual Differences in Responses and Response Times to the Hungarian WISC-IV Block Design Test

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