论文信息 - On the Hopfield Neural Networks and Mean Field Theory

On the Hopfield Neural Networks and Mean Field Theory

In this paper, we analyse mathematically the relationship between the mean field theory network (MFT) model and the continuous-time Hopfield neural network by the use of the theory of dynamical systems. This MFT model, which is obtained by applying the mean field approximation to the Boltzmann machine, is a discrete-time recurrent neural network. We prove that the set of asymptotically stable fixed points of the asynchronous MFT model coincides with the set of asymptotically stable equilibria of the continuous-time Hopfield neural network. Therefore, it is shown that the asynchronous MFT model is equivalent to the Hopfield neural network on the nature of the fixed points (or equilibria). Copyright 1996 Elsevier Science Ltd.

Naoki Kurita | Ken-ichi Funahashi | Ken-ichi Funahashi | Naoki Kurita

[1] J. J. Hopfield,et al. “Neural” computation of decisions in optimization problems , 1985, Biological Cybernetics.

[2] R. Devaney. An Introduction to Chaotic Dynamical Systems , 1990 .

[3] Carsten Peterson,et al. A Mean Field Theory Learning Algorithm for Neural Networks , 1987, Complex Syst..

[4] J J Hopfield,et al. Neurons with graded response have collective computational properties like those of two-state neurons. , 1984, Proceedings of the National Academy of Sciences of the United States of America.

[5] Wesley E. Snyder,et al. Optimization by Mean Field Annealing , 1988, NIPS.

[6] M. Hirsch,et al. Differential Equations, Dynamical Systems, and Linear Algebra , 1974 .

[7] David E. van den Bout,et al. Graph partitioning using annealed neural networks , 1990, International 1989 Joint Conference on Neural Networks.

[8] Michael Fleisher. The Hopfield Model with Multi-Level Neurons , 1987, NIPS.

[9] Carsten Peterson,et al. Neural Networks and NP-complete Optimization Problems; A Performance Study on the Graph Bisection Problem , 1988, Complex Syst..

[10] Yoshinori Uesaka. MATHEMATICAL ASPECTS OF NEURO-DYNAMICS FOR COMBINATORIAL OPTIMIZATION , 1991 .

[11] B. Wendroff. Theoretical Numerical Analysis , 1966 .

[12] Geoffrey E. Hinton,et al. A Learning Algorithm for Boltzmann Machines , 1985, Cogn. Sci..