I am fitting a mixed effects model in R using gamm4. The outcome is binary. The exposure is a continuous variable. There are data on over 400 participants with between 1-4 measurements each.
As well as trying to model random individual differences and any correlation in the repeated measurements I would also like to incorporate individual variation in exposure so as to model any association between exposure and outcome on a more general or population level - this is my main aim. For example: the exposure was not experienced in controlled conditions and so to deem that two participants, who both experienced the exposure measured at say x, were equally exposed would not be true. it's possible for participants to have received exposures that varied in severity for example. Some would have had repeated high exposures or repeated low exposures or combinations of high and low. Some participants had only 1 measurement.
This is my model.
gamm4(binary ~ s(exposure,k = 5, bs="tp") + confounders_cat + confounders_cont , family=binomial(), data = dat , scale = -1, random = ~(1 + exposure|participant) )
It seems incorrect to specify the exposure, grouped for each participant as part of the random effect, when I also specify the exposure in the fixed effect smooth which also is passed to lmer to assess any RE for it. But I think this model carries out what I want.
I have also used the more straight forward
gamm4(binary ~ s(exposure,k = 5, bs="tp") + confounders_cat + confounders_cont , family=binomial(), data = dat , scale = -1, random = ~(1|participant) )
but I don't think it does all that I need.
I have trawled through the net and publications but haven't seen a clear answer to this any where.
I would appreciate some thoughts on this.
If it helps here is some out put from the two models.
Generalized linear mixed model fit by the Laplace approximation AIC BIC logLik deviance 1141 1189 -560.3 1121 Random effects: Groups Name Variance Std.Dev. Corr participant (Intercept) 3.41848 1.84891 exposure 0.15962 0.39953 0.930 Xr s(exposure) 18.88469 4.34565 Number of obs: 890, groups: id, 477; Xr, 3 Fixed effects: Estimate Std. Error z value Pr(>|z|) X(Intercept) 1.146249 1.002907 1.143 0.25307 Xconfound1 -0.076835 0.429267 -0.179 0.85794 Xconfound12 0.115749 0.067549 1.714 0.08661 . Xconfound3 -0.000654 0.008374 -0.078 0.93775 Xconfound4 0.047821 0.029244 1.635 0.10200 Xs(exposure)Fx1 0.504708 0.189812 2.659 0.00784 **
Generalized linear mixed model fit by the Laplace approximation AIC BIC logLik deviance 1129 1167 -556.5 1113 Random effects: Groups Name Variance Std.Dev. participant (Intercept) 15.832 3.9790 Xr s(exposure) 14.863 3.8553 Number of obs: 890, groups: id, 477; Xr, 3 Fixed effects: Estimate Std. Error z value Pr(>|z|) X(Intercept) 3.3354161 1.1299631 2.952 0.00316 ** Xconfound1 -0.2505650 0.5766628 -0.434 0.66392 Xconfound2 0.1187083 0.0905026 1.312 0.18964 Xconfound3 -0.0106580 0.0087761 -1.214 0.22458 Xconfound4 -0.0008171 0.0300302 -0.027 0.97829 Xs(exposure)Fx1 -0.2269257 0.1451085 -1.564 0.11786
Thanks in advance.