Is continued fraction a representational basis for neuronal computing?

Author

Krishnamurthy, E.V.

Author_Institution

Dept. of Comput. Sci., Waikato Univ., Hamilton, New Zealand

fYear

1990

fDate

24-27 Sep 1990

Firstpage

45

Abstract

The author examines the question of whether the continued fraction (CF) is a representational basis for neuronal computing. It is argued that when real or complex numbers are represented by physical quantities such as voltage, current, impedance, etc. and handled using bio-hardware, a natural mathematical representation that supports algorithmic manipulation is the CF. Arguments are provided from network theory, neural network models and distributed algorithm design. In particular, a matrix inversion free linear time algorithm based on CF is described for temporal rational interpolation that can be used for the design of impulse response filters, in conjunction with Laplace or z -transforms

Keywords

function approximation; interpolation; neural nets; Laplace transforms; complex numbers; continued fraction; distributed algorithm design; impulse response filters; matrix inversion free linear time algorithm; network theory; neural network models; neuronal computing; real numbers; representational basis; temporal rational interpolation; z-transforms; Algorithm design and analysis; Biological system modeling; Biology computing; Computer networks; Filtering theory; Mathematical model; Mathematics; Neural network hardware; Neural networks; Voltage;

fLanguage

English

Publisher

ieee

Conference_Titel

Computer and Communication Systems, 1990. IEEE TENCON'90., 1990 IEEE Region 10 Conference on

Print_ISBN

0-87942-556-3

Type

conf

DOI

10.1109/TENCON.1990.152563

Filename

152563