Title :
Robust linear and support vector regression
Author :
Mangasarian, Olvi L. ; Musicant, David R.
Author_Institution :
Dept. of Comput. Sci., Wisconsin Univ., Madison, WI, USA
fDate :
9/1/2000 12:00:00 AM
Abstract :
The robust Huber M-estimator, a differentiable cost function that is quadratic for small errors and linear otherwise, is modeled exactly, in the original primal space of the problem, by an easily solvable simple convex quadratic program for both linear and nonlinear support vector estimators. Previous models were significantly more complex or formulated in the dual space and most involved specialized numerical algorithms for solving the robust Huber linear estimator. Numerical test comparisons with these algorithms indicate the computational effectiveness of the new quadratic programming model for both linear and nonlinear support vector problems. Results are shown on problems with as many as 20000 data points, with considerably faster running times on larger problems
Keywords :
convex programming; estimation theory; neural nets; quadratic programming; statistical analysis; computational effectiveness; differentiable cost function; primal space; robust Huber M-estimator; simple convex quadratic program; support vector estimators; support vector regression; Cost function; Kernel; Minimization methods; Newton method; Nonlinear equations; Quadratic programming; Robustness; Switches; Testing; Vectors;
Journal_Title :
Pattern Analysis and Machine Intelligence, IEEE Transactions on
