Your search keyword '"gaussian kernel"' showing total 3 results

1. A Kernel Adaptive Algorithm for Quaternion-Valued Inputs.

Author

Paul, Thomas K. and Ogunfunmi, Tokunbo

Subjects

*QUATERNIONS, *ROBOTICS, *PATTERN recognition systems, *HILBERT space, *KERNEL functions

Abstract

The use of quaternion data can provide benefit in applications like robotics and image recognition, and particularly for performing transforms in 3-D space. Here, we describe a kernel adaptive algorithm for quaternions. A least mean square (LMS)-based method was used, resulting in the derivation of the quaternion kernel LMS (Quat-KLMS) algorithm. Deriving this algorithm required describing the idea of a quaternion reproducing kernel Hilbert space (RKHS), as well as kernel functions suitable with quaternions. A modified HR calculus for Hilbert spaces was used to find the gradient of cost functions defined on a quaternion RKHS. In addition, the use of widely linear (or augmented) filtering is proposed to improve performance. The benefit of the Quat-KLMS and widely linear forms in learning nonlinear transformations of quaternion data are illustrated with simulations. [ABSTRACT FROM PUBLISHER]

Published

2015

2. Is Extreme Learning Machine Feasible? A Theoretical Assessment (Part II).

Author

Lin, Shaobo, Liu, Xia, Fang, Jian, and Xu, Zongben

Subjects

*GAUSSIAN distribution, *GENERALIZATION, *ARTIFICIAL neural networks, *MACHINE learning, *APPROXIMATION theory

Abstract

An extreme learning machine (ELM) can be regarded as a two-stage feed-forward neural network (FNN) learning system that randomly assigns the connections with and within hidden neurons in the first stage and tunes the connections with output neurons in the second stage. Therefore, ELM training is essentially a linear learning problem, which significantly reduces the computational burden. Numerous applications show that such a computation burden reduction does not degrade the generalization capability. It has, however, been open that whether this is true in theory. The aim of this paper is to study the theoretical feasibility of ELM by analyzing the pros and cons of ELM. In the previous part of this topic, we pointed out that via appropriately selected activation functions, ELM does not degrade the generalization capability in the sense of expectation. In this paper, we launch the study in a different direction and show that the randomness of ELM also leads to certain negative consequences. On one hand, we find that the randomness causes an additional uncertainty problem of ELM, both in approximation and learning. On the other hand, we theoretically justify that there also exist activation functions such that the corresponding ELM degrades the generalization capability. In particular, we prove that the generalization capability of ELM with Gaussian kernel is essentially worse than that of FNN with Gaussian kernel. To facilitate the use of ELM, we also provide a remedy to such a degradation. We find that the well-developed coefficient regularization technique can essentially improve the generalization capability. The obtained results reveal the essential characteristic of ELM in a certain sense and give theoretical guidance concerning how to use ELM. [ABSTRACT FROM AUTHOR]

Published

2015

3. Study of the Convergence Behavior of the Complex Kernel Least Mean Square Algorithm.

Author

Paul, Thomas K. and Ogunfunmi, Tokunbo

Subjects

*STOCHASTIC convergence, *KERNEL (Mathematics), *MEAN square algorithms, *MATHEMATICAL complexes, *COST functions, *GAUSSIAN processes

Abstract

The complex kernel least mean square (CKLMS) algorithm is recently derived and allows for online kernel adaptive learning for complex data. Kernel adaptive methods can be used in finding solutions for neural network and machine learning applications. The derivation of CKLMS involved the development of a modified Wirtinger calculus for Hilbert spaces to obtain the cost function gradient. We analyze the convergence of the CKLMS with different kernel forms for complex data. The expressions obtained enable us to generate theory-predicted mean-square error curves considering the circularity of the complex input signals and their effect on nonlinear learning. Simulations are used for verifying the analysis results. [ABSTRACT FROM AUTHOR]

Published

2013