Theoretical and numerical analysis of a chaotic model with nonlocal and stochastic differential operators
İlknur Koca, Abdon Atangana
2023An International Journal of Optimization and Control Theories & Applications (IJOCTA)10 citationsDOIOpen Access PDF
Abstract
A set of nonlinear ordinary differential equations has been considered in this paper. The work tries to establish some theoretical and analytical insights when the usual time-deferential operator is replaced with the Caputo fractional derivative. Using the Caratheodory principle and other additional conditions, we established that the system has a unique system of solutions. A variety of well-known approaches were used to investigate the system. The stochastic version of this system was solved using a numerical approach based on Lagrange interpolation, and numerical simulation results were produced.
Topics & Concepts
MathematicsOrdinary differential equationApplied mathematicsLagrange polynomialChaoticNonlinear systemOperator (biology)Interpolation (computer graphics)Set (abstract data type)Variety (cybernetics)Numerical analysisDifferential operatorWork (physics)Differential equationMathematical analysisComputer scienceMotion (physics)PhysicsBiochemistryRepressorThermodynamicsStatisticsProgramming languageTranscription factorArtificial intelligenceChemistryQuantum mechanicsGenePolynomialFractional Differential Equations SolutionsQuantum chaos and dynamical systemsStatistical Mechanics and Entropy