Title :
Neural systems: how the artificial version models itself after nature
Author :
Gutta, Srinivas V R ; Ranna, M.V. ; Ramakrishna, N.
Author_Institution :
Nat. Inst. of Eng., Mysore, India
Abstract :
The modeling of biological neurons is discussed, which leads to a system of nonlinear differential equations with several state variables for each neuron; this would be untenable in a computational application. A simple mathematical model is obtained retaining some essentials of real dynamic behavior. In order to make the network perform any task, it should be trained or it has to learn to solve the problem. The learning is inherent in biological systems. The learning procedures, supervised and unsupervised learning, are described. Current research on biological neural networks is discussed.<>
Keywords :
neural nets; nonlinear differential equations; physiological models; unsupervised learning; biological neural networks; biological neurons; computational application; learning procedures; nonlinear differential equations; real dynamic behavior; state variables; supervised learning; unsupervised learning; Biological neural networks; Biological system modeling; Biological systems; Biology computing; Computer applications; Differential equations; Mathematical model; Neurons; Nonlinear dynamical systems; Unsupervised learning;
Journal_Title :
Potentials, IEEE
