Title :
Unbiased Least Squares Support Vector Machine with Polynomial kernel
Author :
Zhang, Meng ; Fu, Lihua
Author_Institution :
Dept. of Comput. Sci., Central China Normal Univ., Wuhan
Abstract :
Although least squares support vector machine (LS-SVM) has dramatically reduced the complexity of standard support vector machine (SVM), LS-SVM still costs too much time in tackling regression problems with large data sets. This paper presents an unbiased LS-SVM with inhomogeneous polynomial kernel, which shortens the training time of LS-SVM significantly without obvious loss of accuracy. This new LS-SVM is especially suitable for solving the large scale problems including relatively low dimensional input vectors. We also give an upper bound analytically. When its dimensionality is below the bound, a regression problem can be solved more efficiently by the new LS-SVM than by the standard one. The applications to a synthetic example and to an image interpolation problem show the efficiency of the new LS-SVM
Keywords :
image processing; least squares approximations; polynomials; regression analysis; support vector machines; SVM; image interpolation problem; inhomogeneous polynomial kernel; regression problem; unbiased least squares support vector machine; Costs; Interpolation; Iterative algorithms; Kernel; Large-scale systems; Least squares methods; Mathematics; Polynomials; Support vector machines; Upper bound;
Conference_Titel :
Signal Processing, 2006 8th International Conference on
Conference_Location :
Beijing
Print_ISBN :
0-7803-9736-3
Electronic_ISBN :
0-7803-9736-3
DOI :
10.1109/ICOSP.2006.345767
