| rlsOptIC.Ha4 {RobLox} | R Documentation |
Computation of the optimally robust IC for Ha4 estimators
Description
The function rlsOptIC.Ha4 computes the optimally robust IC for
Ha4 estimators in case of normal location with unknown scale and
(convex) contamination neighborhoods. The definition of
these estimators can be found in Subsection 8.5.2 of Kohl (2005).
Usage
rlsOptIC.Ha4(r, a.start = 0.25, b.start = 2.5, c.start = 5,
k.start = 1, delta = 1e-06, MAX = 100)
Arguments
r |
non-negative real: neighborhood radius. |
a.start |
positive real: starting value for a. |
b.start |
positive real: starting value for b. |
c.start |
positive real: starting value for c. |
k.start |
positive real: starting value for k. |
delta |
the desired accuracy (convergence tolerance). |
MAX |
if a or b or c or k are beyond the admitted values,
|
Details
The computation of the optimally robust IC for Ha4 estimators
is based on optim where MAX is used to
control the constraints on a, b, c and k. The optimal values of
the tuning constants a, b, c and k can be read off
from the slot Infos of the resulting IC.
Value
Object of class "IC"
Author(s)
Matthias Kohl Matthias.Kohl@stamats.de
References
Marazzi, A. (1993) Algorithms, routines, and S functions for robust statistics. Wadsworth and Brooks / Cole.
M. Kohl (2005). Numerical Contributions to the Asymptotic Theory of Robustness. Dissertation. University of Bayreuth. https://epub.uni-bayreuth.de/id/eprint/839/2/DissMKohl.pdf.
See Also
Examples
IC1 <- rlsOptIC.Ha4(r = 0.1)
checkIC(IC1)
Risks(IC1)
Infos(IC1)
plot(IC1)
infoPlot(IC1)