We provide a new algorithm for a four-point nonlocal boundary value problem of nonlinear integro-differential equations of fractional order q is an element of(1,2] based on reproducing kernel space method. According to our work, the analytical solution of the equations is represented in the reproducing kernel space which we construct and so the n-term approximation. At the same time, the n-term approximation is proved to converge to the analytical solution. An illustrative example is also presented, which shows that the new algorithm is efficient and accurate.

• 出版日期2012
• 单位中国人民解放军国防科学技术大学