Dynamics of Symmetrical Discontinuous Hopfield Neural Networks with Poisson Stable Rates, Synaptic Connections and Unpredictable Inputs
Akhmet M. Nugayeva Z. Seilova R.
June 2024Multidisciplinary Digital Publishing Institute (MDPI)
Symmetry
2024#16Issue 6
The purpose of this paper is to study the dynamics of Hopfield neural networks with impulsive effects, focusing on Poisson stable rates, synaptic connections, and unpredictable external inputs. Through the symmetry of impulsive and differential compartments of the model, we follow and extend the principal dynamical ideas of the founder. Specifically, the research delves into the phenomena of unpredictability and Poisson stability, which have been examined in previous studies relating to models of continuous and discontinuous neural networks with constant components. We extend the analysis to discontinuous models characterized by variable impulsive actions and structural ingredients. The method of included intervals based on the B-topology is employed to investigate the networks. It is a novel approach that addresses the unique challenges posed by the sophisticated recurrence.
asymptotic stability , B-topology , discontinuous Hopfield neural networks , discontinuous unpredictable solutions , method of included intervals , Poisson couples , symmetry of impulsive and differential compartments , unpredictable functions , unpredictable sequences
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Department of Mathematics, Middle East Technical University, Ankara, 06800, Turkey
Department of Mathematics, K. Zhubanov Aktobe Regional University, Aktobe, 030000, Kazakhstan
Institute of Information and Computational Technologies, Almaty, 050010, Kazakhstan
Department of Mathematics
Department of Mathematics
Institute of Information and Computational Technologies
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