Litcius/Paper detail

Fixed-/predefined-time stabilization and synchronization of memristor chaotic circuits

Ru‐Ru Ma, Zhixiang Huang

2023International Journal of Modern Physics C10 citationsDOI

Abstract

This investigation discusses the problems of fixed-/predefined-time stabilization and synchronization of memristor chaotic circuits (MCCs). Specially, all of the proposed control schemes are differentiable, namely smooth, which are superior to the previous finite-/fixed-time control techniques, because the discontinuous signum and absolute functions are not contained anymore. Comparing with the traditional fast convergence of chaotic systems, the upper-bound estimation of convergence time in this investigation is not only irrelevant to the initial values of MCCs, but also concise and explicit. Moreover, according to the Lyapunov stability theory, the sufficient criteria are established successively for ensuring the fixed-/predefined-time stabilization and synchronization of MCCs. Finally, the numerical simulations are placed to validate the effectiveness and feasibility of obtained results, in which the comparison is made and the effect of controlling parameters on the convergence speed is further explored.

Topics & Concepts

Synchronization (alternating current)Convergence (economics)MemristorControl theory (sociology)ChaoticLyapunov stabilityComputer scienceChaotic systemsStability (learning theory)Differentiable functionLyapunov functionElectronic circuitFixed pointSynchronization of chaosUpper and lower boundsMathematicsControl (management)Topology (electrical circuits)Nonlinear systemPhysicsEngineeringEconomicsArtificial intelligenceElectrical engineeringQuantum mechanicsMachine learningEconomic growthCombinatoricsMathematical analysisNeural Networks Stability and SynchronizationAdvanced Memory and Neural Computingstochastic dynamics and bifurcation