Frontier of Higher Education

In this paper, a new collocation method based on fractional polynomials is proposed for solving fractional integro-di erential equations with weakly singular kernel. For solving the equation, the di culties lie in choosing the space of the exact solution. In this paper, we solve this problem perfectly and propose the concept of the fractional Cα space. Meanwhile, a dense subset of this fractional Cα space is obtained. Based on the fractional Cα space, a strict theory for obtaining the ε-approximate solution is established. Using our method, a small amount of calculation can gain an accuracy satisfying the application requirements. The e ciency of the proposed method is verified by the final numerical experiments through comparing with those reported in A fast numerical algorithm based on the second kind Chebyshev polynomials for fractional integro-di erential equations with weakly singular kernels.

Collocation method; Fractional integro-di erential equations; Weakly singular kernel; Fractional Cα space

B.Q. Tang, X.F. Li, Solution of a class of Volterra integral equations with singular and weakly singular kernels, Appl. Math. Comput. 199 (2008) 406-413.

V.V. Zozulya, P.I. Gonzalez-Chi, Weakly singular, singular andhypersingular integrals in 3-D elasticity and fracture mechanics, J.Chin. Inst. Eng. 22 (1999) 763-775.

S. Momani, A. Jameel, S. Al-Azawi, Local and global uniquenesstheorems on fractional integro-differential equations via Biharis andGronwalls inequalities, Soochow J. Math. 33 (2007) 619-627.

J. Zhao, J. Xiao, N.J. Ford, Collocation methods for fractionalintegrodifferential equations with weakly singular kernels, Numer.Algorithms 65 (2014) 723-743.

S. Nemati, S. Sedaghat, I. Mohammadi, A fast numerical algorithm based on the second kind Chebyshev polynomials for fractional integrodifferential equations with weakly singular kernels, J. Comput. Appl. Math. 308 (2016) 231-242.

K. Diethelm, The analysis of fractional differential equations, Lecture Notes in Mathematics, 2004.

Q.J. Yan, Numerical analysis, Beihang University Press, 2001.