Unconstrained logistic or Poisson regression with multiple compositional predictors {Compositional} | R Documentation |
Unconstrained logistic or Poisson regression with multiple compositional predictors
Description
Unconstrained logistic or Poisson regression with multiple compositional predictors.
Usage
ulc.glm2(y, x, z = NULL, model = "logistic", xnew = NULL, znew = NULL)
Arguments
y |
A numerical vector containing the response variable values. This is either a binary variable or a vector with counts. |
x |
A list with multiple matrices with the predictor variables, the compositional data. No zero values are allowed. |
z |
A matrix, data.frame, factor or a vector with some other covariate(s). |
model |
This can be either "logistic" or "poisson". |
xnew |
A matrix containing a list with multiple matrices with compositional data whose response is to be predicted. If you have no new data, leave this NULL as is by default. |
znew |
A matrix, data.frame, factor or a vector with the values of some other covariate(s). If you have no new data, leave this NULL as is by default. |
Details
The function performs the unconstrained log-contrast logistic or Poisson regression model. The logarithm of the
compositional predictor variables is used (hence no zero values are allowed). The response variable
is linked to the log-transformed data without the constraint that the sum of the regression coefficients
equals 0. If you want the regression without the zum-to-zero contraints see lc.glm2
.
Extra predictors variables are allowed as well, for instance categorical or continuous.
Value
A list including:
devi |
The residual deviance of the logistic or Poisson regression model. |
be |
The unconstrained regression coefficients. Their sum does not equal 0. |
est |
If the arguments "xnew" and znew were given these are the predicted or estimated values, otherwise it is NULL. |
Author(s)
Michail Tsagris.
R implementation and documentation: Michail Tsagris mtsagris@uoc.gr.
References
Aitchison J. (1986). The statistical analysis of compositional data. Chapman & Hall.
Lu J., Shi P., and Li H. (2019). Generalized linear models with linear constraints for microbiome compositional data. Biometrics, 75(1): 235–244.
See Also
Examples
y <- rbinom(150, 1, 0.5)
x <- list()
x1 <- as.matrix(iris[, 2:4])
x1 <- x1 / rowSums(x1)
x[[ 1 ]] <- x1
x[[ 2 ]] <- rdiri(150, runif(4) )
x[[ 3 ]] <- rdiri(150, runif(5) )
mod <- ulc.glm2(y, x)