Title :
The hysteretic Hopfield neural network
Author :
Bharitkar, Sunil ; Mendel, Jerry M.
Author_Institution :
Dept. of Electr. Eng., Southern California Univ., Los Angeles, CA, USA
Abstract :
Several neuron activation functions have been proposed (e.g., linear, binary, sigmoid) for recurrent and multilayer artificial neural networks. In this paper we present a hysteretic neuron activation function for optimization and learning. We prove Lyapunov stability of a hysteretic Hopfield neural network, and then solve a combinatorial optimization problem (i.e., the N-queen problem) using this network. We demonstrate the advantages of hysteresis by showing increased frequency of convergence to a solution, when the parameters associated with the activation function are varied
Keywords :
Hopfield neural nets; Lyapunov methods; combinatorial mathematics; hysteresis; optimisation; Lyapunov stability; N-queen problem; activation function; combinatorial optimization problem; hysteretic Hopfield neural network; multilayer artificial neural networks; neuron activation functions; recurrent artificial neural networks; Artificial neural networks; Associative memory; Frequency; Hopfield neural networks; Hysteresis; Lyapunov method; Magnetic materials; Multi-layer neural network; Neurons; Oscillators;
Conference_Titel :
Neural Networks Proceedings, 1998. IEEE World Congress on Computational Intelligence. The 1998 IEEE International Joint Conference on
Conference_Location :
Anchorage, AK
Print_ISBN :
0-7803-4859-1
DOI :
10.1109/IJCNN.1998.686023
