The Characteristic Equation And Solution Of Caputo Fractional Differential Equation
2015-05-13 18:31JiZhang
卷宗 2015年3期
Ji Zhang
Abstract: In this paper, we study the following fractional differential equation:
Where with m and n being positive integers, f is
a smooth function and is a integrable function, through mean value theorem and linearize problem, we find the characteristic equation and its solution.
Keywords: Fractional different equation, characteristic equation.
1 Introduction
Fractional calculus includes fractional order integral and fractional derivative, because its valuable applications, fractional calculus has gained enough importance. See[1,2,3,4]
Liouville, Riemann, Leibniz have studied the earliest systematic and Caputo defines the fractional differential.
The paper will study the following equation:
(1.1)
Where with m and n being positive integers, f is
a smooth function and is a integrable function, through mean value theorem and linearize problem, we find the characteristic equation and its solution.
2 Main Results
Proposition 2.1: Suppose that is a smooth function and there is a such that , then the linearization of (1.1) near the equilibrium
Subsitituting it into (2.7), we have (2.5) and (2.6)
Reference
[1]Samko,S.G.,Kilbas,A.A.,Marivhev,O.I.: Fractional Integrals and Derivatives: Theory and Applications. Gordon and Breach, Yverdon(1993)
[2]Rabei, E.M., Nawafleh,K.I. Baleanu, D.: The Hamiltonian formalism with fractional derivatives. J.Math Anal.Appl.327,891-897(2007)
[3]Bhalekar, S., Daftardar-Gejji, V.Baleanu, D., Magin, R: Fractional Bloch equation with delay.Comput,Math.appl.61(5),1355-1365(2007)
[4] Kilbas, A.A., Srivastava, H.M., Trujillo, J.J., Theory and Applications of Fractional Differential Equations. North-Holland Mathematics Studies, vol. 204. Elsevier, Amsterdam, 2006
