Litcius/Paper detail

Hierarchical Quasi-Fractional Gradient Descent Method for Parameter Estimation of Nonlinear ARX Systems Using Key Term Separation Principle

Naveed Ishtiaq Chaudhary, Muhammad Asif Zahoor Raja, Zeshan Aslam Khan, Khalid Mehmood Cheema, Ahmad H. Milyani

2021Mathematics27 citationsDOIOpen Access PDF

Abstract

Recently, a quasi-fractional order gradient descent (QFGD) algorithm was proposed and successfully applied to solve system identification problem. The QFGD suffers from the overparameterization problem and results in estimating the redundant parameters instead of identifying only the actual parameters of the system. This study develops a novel hierarchical QFDS (HQFGD) algorithm by introducing the concepts of hierarchical identification principle and key term separation idea. The proposed HQFGD is effectively applied to solve the parameter estimation problem of input nonlinear autoregressive with exogeneous noise (INARX) system. A detailed investigation about the performance of HQFGD is conducted under different disturbance conditions considering different fractional orders and learning rate variations. The simulation results validate the better performance of the HQFGD over the standard counterpart in terms of estimation accuracy, convergence speed and robustness.

Topics & Concepts

Robustness (evolution)Nonlinear systemAutoregressive modelGradient descentTerm (time)Computer scienceEstimation theorySystem identificationNoise (video)Key (lock)Identification (biology)Convergence (economics)Control theory (sociology)AlgorithmMathematical optimizationRate of convergenceParameter identification problemMathematicsArtificial neural networkArtificial intelligenceModel parameterStatisticsData miningImage (mathematics)BotanyGeneMeasure (data warehouse)BiologyEconomicsEconomic growthQuantum mechanicsComputer securityChemistryBiochemistryPhysicsControl (management)Advanced Control Systems DesignBlind Source Separation TechniquesControl Systems and Identification