TY - JOUR
T1 - Mixtures of peaked power Batschelet distributions for circular data with application to saccade directions
AU - Mulder, Kees
AU - Klugkist, Irene
AU - van Renswoude, Daan
AU - Visser, Ingmar
PY - 2020/4/1
Y1 - 2020/4/1
N2 - Circular data are encountered throughout a variety of scientific disciplines, such as in eye movement research as the direction of saccades. Motivated by such applications, mixtures of peaked circular distributions are developed. The peaked distributions are a novel family of Batschelet-type distributions, where the shape of the distribution is warped by means of a transformation function. Because the Inverse Batschelet distribution features an implicit inverse that is not computationally feasible for large or complex data, an alternative called the Power Batschelet distribution is introduced. This distribution is easy to compute and mimics the behavior of the Inverse Batschelet distribution. Inference is performed in both the frequentist framework, through Expectation–Maximization (EM) and the bootstrap, and the Bayesian framework, through MCMC. All parameters can be fixed, which may be done by assumption to reduce the number of parameters. Model comparison can be performed through information criteria or through bridge sampling in the Bayesian framework, which allows performing a wealth of hypothesis tests through the Bayes factor. An R package, flexcircmix, is available to perform these analyses.
AB - Circular data are encountered throughout a variety of scientific disciplines, such as in eye movement research as the direction of saccades. Motivated by such applications, mixtures of peaked circular distributions are developed. The peaked distributions are a novel family of Batschelet-type distributions, where the shape of the distribution is warped by means of a transformation function. Because the Inverse Batschelet distribution features an implicit inverse that is not computationally feasible for large or complex data, an alternative called the Power Batschelet distribution is introduced. This distribution is easy to compute and mimics the behavior of the Inverse Batschelet distribution. Inference is performed in both the frequentist framework, through Expectation–Maximization (EM) and the bootstrap, and the Bayesian framework, through MCMC. All parameters can be fixed, which may be done by assumption to reduce the number of parameters. Model comparison can be performed through information criteria or through bridge sampling in the Bayesian framework, which allows performing a wealth of hypothesis tests through the Bayes factor. An R package, flexcircmix, is available to perform these analyses.
KW - Circular statistics
KW - Metropolis–Hastings
KW - Peaked distributions
UR - http://www.scopus.com/inward/record.url?scp=85078659812&partnerID=8YFLogxK
U2 - 10.1016/j.jmp.2019.102309
DO - 10.1016/j.jmp.2019.102309
M3 - Article
AN - SCOPUS:85078659812
SN - 0022-2496
VL - 95
JO - Journal of Mathematical Psychology
JF - Journal of Mathematical Psychology
M1 - 102309
ER -