Litcius/Paper detail

New predefined-time stability theorem and synchronization of fractional-order memristive delayed BAM neural networks

Jiale Chen, Weigang Sun, Song Guo Zheng

2025Communications in Nonlinear Science and Numerical Simulation36 citationsDOIOpen Access PDF

Abstract

This study introduces a novel theorem focusing on predefined-time stability within fractional-order systems and applies it to the domain of predefined-time synchronization in fractional-order memristive delayed bidirectional associative memory neural networks . Leveraging the inherent characteristics of fractional-order calculus and the fractional-order comparison principle, this theorem is showcased. Unlike existing predefined-time stability theorems that rely on integer-order counterparts, our theorem adopts the fractional-order framework. By utilizing this theorem as a foundation, efficient controllers are developed to achieve predefined-time synchronization. The theoretical outcomes are verified through the examination of two numerical examples, affirming the robustness and applicability of our approach.

Topics & Concepts

Synchronization (alternating current)Stability (learning theory)Artificial neural networkMemristorControl theory (sociology)Order (exchange)MathematicsStability theoremApplied mathematicsTopology (electrical circuits)Computer scienceMathematical analysisCombinatoricsArtificial intelligenceEconomicsElectronic engineeringEngineeringFinanceCauchy distributionControl (management)Machine learningNeural Networks Stability and Synchronizationstochastic dynamics and bifurcationNeural Networks and Applications
New predefined-time stability theorem and synchronization of fractional-order memristive delayed BAM neural networks | Litcius