Daniel Baffet
A scheme for approximating the kernel $w$ of the fractional $α$-integral by a linear combination of exponentials is proposed and studied. The scheme is based on the application of a composite Gauss-Jacobi quadrature rule to an integral representation of $w$. This results in an approximation of $w$ in an interval $[δ,T]$, with $0<δ$, which converges rapidly in the number $J$ of quadrature nodes associated with each interval of the composite rule. Using error analysis for Gauss-Jacobi quadratures for analytic functions, an estimate of the relative pointwise error is obtained. The estimate shows that the number of terms required for the approximation to satisfy a prescribed error tolerance is bounded for all $α\in(0,1)$, and that $J$ is bounded for $α\in(0,1)$, $T>0$, and $δ\in(0,T)$.