Title :
Multistability of competitive neural networks with different time scales
Author_Institution :
Sch. of Comput. Sci. & Eng., Univ. of Electron. Sci. & Technol. of China, Chengdu, China
Abstract :
Multistability is an important property of recurrent neural networks. It plays a crucial role in some applications, such as decision making, association memory, etc. This paper studies multistability of a class of neural networks with different time scales under the assumption that the activation functions are unsaturated piecewise linear functions. Using local inhibition to the synaptic weights of the networks, it is shown that the trajectories of the network are bounded. A global attractive set which may contain multi-equilibrium points is obtained. Complete convergence is proved by constructing an energy-like function. Simulations are employed to illustrate the theory.
Keywords :
convergence; piecewise linear techniques; recurrent neural nets; transfer functions; unsupervised learning; activation functions; bounded trajectories; competitive neural networks; complete convergence; energy-like function; global attractive set; local inhibition; multi-equilibrium points; multistability; recurrent neural networks; synaptic weights; time scales; unsaturated piecewise linear functions; Computational intelligence; Computer networks; Computer science; Convergence; Decision making; Laboratories; Neural networks; Neurons; Piecewise linear techniques; Recurrent neural networks;
Conference_Titel :
Communications, Circuits and Systems, 2005. Proceedings. 2005 International Conference on
Print_ISBN :
0-7803-9015-6
DOI :
10.1109/ICCCAS.2005.1495263
