Three-Point Compact Approximation for the Caputo Fractional Derivative

Abstract

In this paper we derive the fourth-order asymptotic expansions of the trapezoidal approximation for the fractional integral and the L1 approximation for the Caputo derivative. We use the expansion of the L1 approximation to obtain the three point compact approximation for the Caputo derivative equation* 1Γ(2-α)hαΣk=0n δk(α) yn-k=1312y(α)n-16y(α)n-1+112y(α)n-2+O(h3-α), equation* with weights δ0(α)=1-ζ(α-1),\; δn(α)=(n-1)1 -α-n1-α, δ1(α)=21-α-2+2ζ(α-1),\; δ2(α)=1-22-α+31-α-ζ(α-1), δk(α)=(k-1)1-α-2k1-a+(k+1)1-α, (k=3·s,n-1), where y is a differentiable function which satisfies y'(0)=0. The numerical solutions of the fractional relaxation and the time-fractional subdiffusion equations are discussed.