Change point models for cognitive tests using semi-parametric maximum likelihood

Random-effects change point models are formulated for longitudinal data obtained from cognitive tests. The conditional distribution of the response variable in a change point model is often assumed to be normal even if the response variable is discrete and shows ceiling effects. For the sum score of a cognitive test, the binomial and the beta-binomial distributions are presented as alternatives to the normal distribution. Smooth shapes for the change point models are imposed. Estimation is by marginal maximum likelihood where a parametric population distribution for the random change point is combined with a non-parametric mixing distribution for other random effects. An extension to latent class modelling is possible in case some individuals do not experience a change in cognitive ability. The approach is illustrated using data from a longitudinal study of Swedish octogenarians and nonagenarians that began in 1991. Change point models are applied to investigate cognitive change in the years before death.

[1]  S. Greven,et al.  On the behaviour of marginal and conditional AIC in linear mixed models , 2010 .

[2]  G. Molenberghs,et al.  Models for Discrete Longitudinal Data , 2005 .

[3]  Alfred A. Bartolucci,et al.  An examination of Bayesian statistical approaches to modeling change in cognitive decline in an Alzheimer's disease population , 2009, Math. Comput. Simul..

[4]  J. Fox Bayesian Item Response Modeling: Theory and Applications , 2010 .

[5]  Jean-Paul Fox,et al.  A mixture model for the joint analysis of latent developmental trajectories and survival , 2011, Statistics in medicine.

[6]  S. Folstein,et al.  "Mini-mental state". A practical method for grading the cognitive state of patients for the clinician. , 1975, Journal of psychiatric research.

[7]  A. Tishler,et al.  A New Maximum Likelihood Algorithm for Piecewise Regression , 1981 .

[8]  Grace S. Chiu,et al.  Bent-Cable Regression Theory and Applications , 2006 .

[9]  Luc Bauwens,et al.  On Marginal Likelihood Computation in Change-Point Models , 2012, Comput. Stat. Data Anal..

[10]  Klaus F. Riegel,et al.  Development, Drop, and Death. , 1972 .

[11]  Ardo van den Hout,et al.  Smooth random change point models , 2011, Statistics in medicine.

[12]  Bradley P. Carlin,et al.  Bayesian Methods for Data Analysis , 2008 .

[13]  A. Agresti,et al.  Categorical Data Analysis , 1991, International Encyclopedia of Statistical Science.

[14]  F. Matthews,et al.  Random change point models: investigating cognitive decline in the presence of missing data , 2011 .

[15]  S. MacDonald,et al.  Contrasting cognitive trajectories of impending death and preclinical dementia in the very old , 2006, Neurology.

[16]  David W. Bacon,et al.  Estimating the transition between two intersecting straight lines , 1971 .

[17]  Juni Palmgren,et al.  A random change point model for assessing variability in repeated measures of cognitive function , 2008, Statistics in medicine.

[18]  T R Holford,et al.  Change points in the series of T4 counts prior to AIDS. , 1995, Biometrics.

[19]  Lynn Kuo,et al.  Bayesian and profile likelihood change point methods for modeling cognitive function over time , 2003, Comput. Stat. Data Anal..

[20]  B. Muthén,et al.  Growth mixture modeling , 2008 .

[21]  Robert D. Howe,et al.  Bayesian change‐point analysis for atomic force microscopy and soft material indentation , 2009, 0909.5438.

[22]  M. Aitkin A General Maximum Likelihood Analysis of Variance Components in Generalized Linear Models , 1999, Biometrics.

[23]  S. Covey,et al.  Substantial Genetic Influence on Cognitive Abilities in Twins 80 or More Years Old , 1997 .

[24]  P. McCullagh,et al.  Generalized Linear Models , 1992 .

[25]  Peter K. Dunn,et al.  Randomized Quantile Residuals , 1996 .

[26]  Muthén Bengt,et al.  Growth Mixture Modeling , 2008, Encyclopedia of Autism Spectrum Disorders.

[27]  John Hinde,et al.  Statistical Modelling in R , 2009 .

[28]  Geert Molenberghs,et al.  Joint models for longitudinal data: Introduction and overview , 2008 .

[29]  Modelling bounded health scores with censored skew‐normal distributions , 2011, Statistics in medicine.

[30]  R. Rigby,et al.  Generalized additive models for location, scale and shape , 2005 .

[31]  Ben C. Juricek Generalized Linear Mixed-Effects Models in R , 2003 .

[32]  V. Muggeo,et al.  Modeling temperature effects on mortality: multiple segmented relationships with common break points. , 2008, Biostatistics.

[33]  Donald Hedeker,et al.  Longitudinal Data Analysis , 2006 .

[34]  Detecting break points in generalised linear models , 1992 .

[35]  P. Cohen,et al.  Applied data analytic techniques for turning points research , 2012 .