Numerical investigation of distributed‐order fractional optimal control problems via Bernstein wavelets
Parisa Rahimkhani, Yadollah Ordokhani
Abstract
Summary The aim of this article is to investigate an efficient computational method for solving distributed‐order fractional optimal control problems. In the proposed method, a new Riemann‐Liouville fractional integral operator for the Bernstein wavelet is given. This approach is based on a combination of the Bernstein wavelets basis, fractional integral operator, Gauss‐Legendre numerical integration, and Newton's method for solving obtained system. Easy implementation, simple operations, and accurate solutions are the essential features of the proposed method. The error analysis of the proposed method is carried out. Examples reveal the applicability of the proposed technique.
Topics & Concepts
Legendre waveletWaveletOperator (biology)Applied mathematicsMathematicsLegendre polynomialsFractional calculusOrder (exchange)Bernstein polynomialComputer scienceMathematical optimizationMathematical analysisWavelet transformDiscrete wavelet transformBiochemistryArtificial intelligenceRepressorFinanceGeneTranscription factorChemistryEconomicsFractional Differential Equations SolutionsIterative Methods for Nonlinear EquationsDifferential Equations and Numerical Methods