Title :
The separability theory of hyperbolic tangent kernels and support vector machines for pattern classification
Author :
Sellathurai, Mathni ; Haykin, Simon
Author_Institution :
McMaster Univ., Hamilton, Ont., Canada
Abstract :
A new theory is developed for the feature spaces of hyperbolic tangent used as an activation kernel for non-linear support vector machines. The theory developed herein is based on the distinct features of hyperbolic geometry, which leads to an interesting geometrical interpretation of the higher-dimensional feature spaces of neural networks using hyperbolic tangent as the activation function. The new theory is used to explain the separability of hyperbolic tangent kernels where we show that the separability is possible only for a certain class of hyperbolic kernels. Simulation results are given supporting the separability theory
Keywords :
feature extraction; neural nets; pattern classification; vector processor systems; feature spaces; geometrical interpretation; higher-dimensional feature spaces; hyperbolic geometry; hyperbolic tangent kernels; neural networks; nonlinear support vector machines; pattern classification; separability theory; simulation results; Extraterrestrial measurements; Geometry; Hilbert space; Kernel; Neural networks; Pattern classification; Space stations; Support vector machine classification; Support vector machines;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 1999. Proceedings., 1999 IEEE International Conference on
Conference_Location :
Phoenix, AZ
Print_ISBN :
0-7803-5041-3
DOI :
10.1109/ICASSP.1999.759878
