Two families of novel second-order fractional numerical formulas and their applications to fractional differential equations

Abstract

In this article, we introduce two families of novel fractional θ-methods by constructing some new generating functions to discretize the Riemann-Liouville fractional calculus operator Iα with a second order convergence rate. A new fractional BT-θ method connects the fractional BDF2 (when θ=0) with fractional trapezoidal rule (when θ=1/2), and another novel fractional BN-θ method joins the fractional BDF2 (when θ=0) with the second order fractional Newton-Gregory formula (when θ=1/2). To deal with the initial singularity, correction terms are added to achieve an optimal convergence order. In addition, stability regions of different θ-methods when applied to the Abel equations of the second kind are depicted, which demonstrate the fact that the fractional θ-methods are A()-stable. Finally, numerical experiments are implemented to verify our theoretical result on the convergence analysis.