Parametric Links for Binomial Generalized Linear Models
Various symmetric and asymmetric parametric links for use as link function for binomial generalized linear models.
gj(phi, verbose = FALSE) foldexp(phi, verbose = FALSE) ao1(phi, verbose = FALSE) ao2(phi, verbose = FALSE) talpha(alpha, verbose = FALSE, splineinv = TRUE, eps = 2 * .Machine$double.eps, maxit = 100) rocke(shape1, shape2, verbose = FALSE) gosset(nu, verbose = FALSE) pregibon(a, b) nblogit(theta) angular(verbose = FALSE) loglog()
phi, a, b |
numeric. |
alpha |
numeric. Parameter in [0,2]. |
shape1, shape2, nu, theta |
numeric. Non-negative parameter. |
splineinv |
logical. Should a (quick and dirty) spline function be used for computing the inverse link function? Alternatively, a more precise but somewhat slower Newton algorithm is used. |
eps |
numeric. Desired convergence tolerance for Newton algorithm. |
maxit |
integer. Maximal number of steps for Newton algorithm. |
verbose |
logical. Should warnings about numerical issues be printed? |
Symmetric and asymmetric families parametric link functions are available. Many families contain the logit for some value(s) of their parameter(s).
The symmetric Aranda-Ordaz (1981) transformation
y = \tfrac{2}{φ}\tfrac{x^φ-(1-x)^φ}{x^φ+(1-x)^φ}
and the asymmetric Aranda-Ordaz (1981) transformation
y = \log([(1-x)^{-φ}-1]/φ)
both contain the logit for φ = 0 and φ = 1 respectively, where the latter also includes the complementary log-log for φ = 0.
The Pregibon (1980) two parameter family is the link given by
y = \frac{x^{a-b}-1}{a-b}-\frac{(1-x)^{a+b}-1}{a+b}.
For a = b = 0 it is the logit. For b = 0 it is symmetric and
b controls the skewness; the heavyness of the tails is controlled by
a. The implementation uses the generalized lambda distribution
gl
.
The Guerrero-Johnson (1982) family
y = \frac{1}{φ}≤ft(≤ft[\frac{x}{1-x}\right]^φ-1\right)
is symmetric and contains the logit for φ = 0.
The Rocke (1993) family of links is, modulo a linear transformation, the
cumulative density function of the Beta distribution. If both parameters are
set to 0 the logit link is obtained. If both parameters equal
0.5 the Rocke link is, modulo a linear transformation, identical to the
angular transformation. Also for shape1
= shape2
= 1, the
identity link is obtained. Note that the family can be used as a one and a two
parameter family.
The folded exponential family (Piepho, 2003) is symmetric and given by
y = ≤ft\{\begin{array}{ll} \frac{\exp(φ x)-\exp(φ(1-x))}{2φ} &(φ \neq 0) \\ x- \frac{1}{2} &(φ = 0) \end{array}\right.
The t_α family (Doebler, Holling & Boehning, 2011) given by
y = α\log(x)-(2-α)\log(1-x)
is asymmetric and contains the logit for φ = 1.
The Gosset family of links is given by the inverse of the cumulative
distribution function of the t-distribution. The degrees of freedom ν
control the heavyness of the tails and is restricted to values >0. For
ν = 1 the Cauchy link is obtained and for ν \to ∞ the link
converges to the probit. The implementation builds on qf
and is
reliable for ν ≥q 0.2. Liu (2004) reports that the Gosset link
approximates the logit well for ν = 7.
Also the (parameterless) angular (arcsine) transformation y = \arcsin(√{x}) is available as a link function.
An object of the class link-glm
, see the documentation of make.link
.
Aranda-Ordaz F (1981). “On Two Families of Transformations to Additivity for Binary Response Data.” Biometrika, 68, 357–363.
Doebler P, Holling H, Boehning D (2012). “A Mixed Model Approach to Meta-Analysis of Diagnostic Studies with Binary Test Outcome.” Psychological Methods, 17(3), 418–436.
Guerrero V, Johnson R (1982). “Use of the Box-Cox Transformation with Binary Response Models.” Biometrika, 69, 309–314.
Koenker R (2006). “Parametric Links for Binary Response.” R News, 6(4), 32–34.
Koenker R, Yoon J (2009). “Parametric Links for Binary Choice Models: A Fisherian-Bayesian Colloquy.” Journal of Econometrics, 152, 120–130.
Liu C (2004). “Robit Regression: A Simple Robust Alternative to Logistic and Probit Regression.” In Gelman A, Meng X-L (Eds.), Applied Bayesian Modeling and Causal Inference from Incomplete-Data Perspectives, Chapter 21, pp. 227–238. John Wiley \& Sons.
Piepho H (2003). The Folded Exponential Transformation for Proportions. Journal of the Royal Statistical Society D, 52, 575–589.
Pregibon D (1980). “Goodness of Link Tests for Generalized Linear Models.” Journal of the Royal Statistical Society C, 29, 15–23.
Rocke DM (1993). “On the Beta Transformation Family.” Technometrics, 35, 73–81.
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