
doi: 10.3934/math.2022154
<abstract><p>This paper investigates global dynamics in fractional-order dual inertial neural networks with time lags. Firstly, according to some crucial features of Mittag-Leffler functions and Banach contracting mapping principle, the existence and uniqueness of $ S $-asymptotically $ \omega $-periodic oscillation of the model are gained. Secondly, by using the comparison principle and the stability criteria of delayed Caputo fractional-order differential equations, global asymptotical stability of the model is studied. In the end, the feasibility and effectiveness of the obtained conclusions are supported by two numerical examples. There are few papers focus on $ S $-asymptotically $ \omega $-periodic dynamics in fractional-order dual inertial neural networks with time-varying lags, apparently, the works in this paper fill some of the gaps.</p></abstract>
global asymptotical stability, neural network, s-asymptotical periodicity, QA1-939, mittag-leffler, inertial, Mathematics
global asymptotical stability, neural network, s-asymptotical periodicity, QA1-939, mittag-leffler, inertial, Mathematics
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