U. Bastolla, G. Parisi
Published 1997-08-28Version 1
The statistical properties of the length of the cycles and of the weights of the attraction basins in fully asymmetric neural networks (i.e. with completely uncorrelated synapses) are computed in the framework of the annealed approximation which we previously introduced for the study of Kauffman networks. Our results show that this model behaves essentially as a Random Map possessing a reversal symmetry. Comparison with numerical results suggests that the approximation could become exact in the infinite size limit.
Comments: 23 pages, 6 figures, Latex, to appear on J. Phys. A
Random maps and attractors in random Boolean networks
The attractors in sequence processing neural networks
Number and length of attractors in a critical Kauffman model with connectivity one
