In this brief, the problem of almost surely exponential stability analysis is considered for neural networks with Levy noise and Markovian switching. The switching parameters are generated from a continuous-time irreducible Markov chain taking value in a finite-state space. The purpose of the problem addressed is to derive a sufficient condition such that the dynamics of the neural network is almost surely exponentially stable. By generalized Ito's formula, strong law of large numbers for martingales and ergodicity of Markov chain, the stochastic analysis approach is developed to establish the desired condition which depends only on the stationary distribution of the Markov chain and some constants. Two numerical examples are given to verify the usefulness of the stability condition.

• 出版日期2014-12-5
• 单位安阳师范学院; 东华大学