Fits a stopping ratio logit/probit/cloglog/cauchit/... regression model to an ordered (preferably) factor response.
sratio(link = "logitlink", parallel = FALSE, reverse = FALSE,
zero = NULL, thresholds = c("unconstrained", "equidistant"),
Treverse = reverse, Tref = if (Treverse) "M" else 1,
whitespace = FALSE)An object of class "vglmff"
(see vglmff-class).
The object is used by modelling functions
such as vglm,
rrvglm
and vgam.
Link function applied to the \(M\)
stopping ratio probabilities.
See Links for more choices.
A logical, or formula specifying which terms have equal/unequal coefficients.
Logical.
By default, the stopping ratios used are
\(\eta_j = logit(P[Y=j|Y \geq j])\)
for \(j=1,\dots,M\).
If reverse is TRUE, then
\(\eta_j = logit(P[Y=j+1|Y \leq j+1])\)
will be used.
Can be an integer-valued vector specifying which
linear/additive predictors are modelled as intercepts only.
The values must be from the set {1,2,...,\(M\)}.
The default value means none are modelled as
intercept-only terms.
See CommonVGAMffArguments for information.
See cumulative for information.
These arguments apply to ordinal
categorical regression models.
See CommonVGAMffArguments for information.
Thomas W. Yee
No check is made to verify that the response is ordinal if the
response is a matrix;
see ordered.
Boersch-Supan (2021) considers a sparse data set
(called budworm)
and the numerical problems encountered when
fitting models such as
cratio,
sratio,
cumulative.
Although improvements to links such as
clogloglink have been made,
currently these family functions have not been
properly adapted to handle sparse data as well as they could.
In this help file the response \(Y\) is assumed to be a factor with ordered values \(1,2,\dots,M+1\), so that \(M\) is the number of linear/additive predictors \(\eta_j\).
There are a number of definitions for the continuation ratio
in the literature. To make life easier, in the VGAM package,
we use continuation ratios (see cratio)
and stopping ratios.
Continuation ratios deal with quantities such as
logitlink(P[Y>j|Y>=j]).
Agresti, A. (2013). Categorical Data Analysis, 3rd ed. Hoboken, NJ, USA: Wiley.
Boersch-Supan, P. H. (2021). Modeling insect phenology using ordinal regression and continuation ratio models. ReScience C, 7.1, 1--14. tools:::Rd_expr_doi("10.18637/jss.v032.i10").
McCullagh, P. and Nelder, J. A. (1989). Generalized Linear Models, 2nd ed. London: Chapman & Hall.
Tutz, G. (2012). Regression for Categorical Data, Cambridge: Cambridge University Press.
Yee, T. W. (2010). The VGAM package for categorical data analysis. Journal of Statistical Software, 32, 1--34. tools:::Rd_expr_doi("10.18637/jss.v032.i10").
cratio,
acat,
cumulative,
multinomial,
margeff,
pneumo,
budworm,
logitlink,
probitlink,
clogloglink,
cauchitlink.
pneumo <- transform(pneumo, let = log(exposure.time))
(fit <- vglm(cbind(normal, mild, severe) ~ let,
sratio(parallel = TRUE), data = pneumo))
coef(fit, matrix = TRUE)
constraints(fit)
predict(fit)
predict(fit, untransform = TRUE)
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