Why a nonlinear solution for a linear problem? [channel equalization]

Author

Adali, Tulay

Author_Institution

Dept. of Comput. Sci. & Electr. Eng., Maryland Univ., Baltimore, MD, USA

fYear

1999

fDate

36373

Firstpage

157

Lastpage

165

Abstract

We emphasize a key point that when there is noise in the system, even if the system is linear, a nonlinear solution is more desirable. We derive a simple expression that shows that for a linear regression model, the logistic nonlinearity will be the natural match for modeling posterior class probabilities, and that the steepness of this logistic function is inversely proportional to the level of noise in the system. We note a problem that matches this data generation mechanism, equalization of an infinite impulse response channel, and show that for this example, the logistic type equalizer not only achieves lower bit error rate than its linear counterpart but is very efficient as well

Keywords

entropy; equalisers; learning (artificial intelligence); minimisation; neural nets; pattern classification; probability; time series; data generation mechanism; equalization; infinite impulse response channel; linear problem; linear regression model; logistic function; logistic nonlinearity; logistic type equalizer; nonlinear solution; posterior class probabilities; Bit error rate; Computer science; Equalizers; Linear regression; Logistics; Neural networks; Noise level; Signal generators; Signal processing; Signal to noise ratio;

fLanguage

English

Publisher

ieee

Conference_Titel

Neural Networks for Signal Processing IX, 1999. Proceedings of the 1999 IEEE Signal Processing Society Workshop.

Conference_Location

Madison, WI

Print_ISBN

0-7803-5673-X

Type

conf

DOI

10.1109/NNSP.1999.788134

Filename

788134