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VGAM (version 0.9-1)

vgam: Fitting Vector Generalized Additive Models

Description

Fit a vector generalized additive model (VGAM). This is a large class of models that includes generalized additive models (GAMs) and vector generalized linear models (VGLMs) as special cases.

Usage

vgam(formula, family, data = list(), weights = NULL, subset = NULL, 
     na.action = na.fail, etastart = NULL, mustart = NULL, 
     coefstart = NULL, control = vgam.control(...), offset = NULL, 
     method = "vgam.fit", model = FALSE, x.arg = TRUE, y.arg = TRUE, 
     contrasts = NULL, constraints = NULL, 
     extra = list(), qr.arg = FALSE, smart = TRUE, ...)

Arguments

formula
a symbolic description of the model to be fit. The RHS of the formula is applied to each linear/additive predictor, and usually includes at least one s term. Different variables in each linear/additive
family
Same as for vglm.
data
an optional data frame containing the variables in the model. By default the variables are taken from environment(formula), typically the environment from which vgam is called.
weights, subset, na.action
Same as for vglm.
etastart, mustart, coefstart
Same as for vglm.
control
a list of parameters for controlling the fitting process. See vgam.control for details.
method
the method to be used in fitting the model. The default (and presently only) method vgam.fit uses iteratively reweighted least squares (IRLS).
constraints, model, offset
Same as for vglm.
x.arg, y.arg
logical values indicating whether the model matrix and response vector/matrix used in the fitting process should be assigned in the x and y slots. Note the model matrix is the LM model matrix; to get the VGAM model matrix
contrasts, extra, qr.arg, smart
Same as for vglm.
...
further arguments passed into vgam.control.

Value

  • An object of class "vgam" (see vgam-class for further information).

WARNING

See warnings in vglm.control.

Details

A vector generalized additive model (VGAM) is loosely defined as a statistical model that is a function of $M$ additive predictors. The central formula is given by $$\eta_j = \sum_{k=1}^p f_{(j)k}(x_k)$$ where $x_k$ is the $k$th explanatory variable (almost always $x_1=1$ for the intercept term), and $f_{(j)k}$ are smooth functions of $x_k$ that are estimated by smoothers. The first term in the summation is just the intercept. Currently only one type of smoother is implemented and this is called a vector (cubic smoothing spline) smoother. Here, $j=1,\ldots,M$ where $M$ is finite. If all the functions are constrained to be linear then the resulting model is a vector generalized linear model (VGLM). VGLMs are best fitted with vglm.

Vector (cubic smoothing spline) smoothers are represented by s() (see s). Local regression via lo() is not supported. The results of vgam will differ from the gam() (in the gam) because vgam() uses a different knot selection algorithm. In general, fewer knots are chosen because the computation becomes expensive when the number of additive predictors $M$ is large.

The underlying algorithm of VGAMs is iteratively reweighted least squares (IRLS) and modified vector backfitting using vector splines. B-splines are used as the basis functions for the vector (smoothing) splines. vgam.fit() is the function that actually does the work. The smoothing code is based on F. O'Sullivan's BART code.

A closely related methodology based on VGAMs called constrained additive ordination (CAO) first forms a linear combination of the explanatory variables (called latent variables) and then fits a GAM to these. This is implemented in the function cao for a very limited choice of family functions.

References

Yee, T. W. and Wild, C. J. (1996) Vector generalized additive models. Journal of the Royal Statistical Society, Series B, Methodological, 58, 481--493.

Yee, T. W. (2008) The VGAM Package. R News, 8, 28--39.

Documentation accompanying the VGAM package at http://www.stat.auckland.ac.nz/~yee contains further information and examples.

See Also

vgam.control, vgam-class, vglmff-class, plotvgam, vglm, s, vsmooth.spline, cao.

Examples

Run this code
# Nonparametric proportional odds model 
pneumo <- transform(pneumo, let = log(exposure.time))
vgam(cbind(normal, mild, severe) ~ s(let),
     cumulative(parallel = TRUE), data = pneumo)

# Nonparametric logistic regression 
fit <- vgam(agaaus ~ s(altitude, df = 2), binomialff, data = hunua)
plot(fit, se = TRUE)
pfit <- predict(fit, type = "terms", raw = TRUE, se = TRUE)
names(pfit)
head(pfit$fitted)
head(pfit$se.fit)
pfit$df
pfit$sigma

# Fit two species simultaneously 
fit2 <- vgam(cbind(agaaus, kniexc) ~ s(altitude, df = c(2, 3)),
             binomialff(mv = TRUE), data = hunua)
coef(fit2, matrix = TRUE)  # Not really interpretable 
plot(fit2, se = TRUE, overlay = TRUE, lcol = 1:2, scol = 1:2)

ooo <- with(hunua, order(altitude))
with(hunua, matplot(altitude[ooo], fitted(fit2)[ooo,], ylim = c(0, 0.8),
     xlab = "Altitude (m)", ylab = "Probability of presence", las = 1,
     main = "Two plant species' response curves", type = "l", lwd = 2))
with(hunua, rug(altitude))

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