Precision algorithms in second-order fractional differential equations
Chunguang Liu
Abstract
Abstract The discretization of fractional-order differential operators is the key to the digital realization of fractional-order controllers. This paper proposes an improved second-order fractional differential equation operation method based on power series expansion. The algorithm's operation speed and accuracy performance are analyzed. The research found that the algorithm proposed in this paper is suitable for the fractional operation of arbitrary signals, including discrete data sequences whose mathematical model is unknown and the solution of linear systems.
Topics & Concepts
DiscretizationRealization (probability)Fractional calculusOrder (exchange)MathematicsPower seriesAlgorithmDifferential equationDifferential (mechanical device)Key (lock)Power (physics)Series (stratigraphy)Applied mathematicsComputer scienceMathematical analysisEngineeringPhysicsComputer securityStatisticsQuantum mechanicsBiologyEconomicsFinanceAerospace engineeringPaleontologyFractional Differential Equations SolutionsAdvanced Control Systems DesignIterative Methods for Nonlinear Equations