Local error estimate of L1 scheme for linearized time fractional KdV equation with weakly singular solutions

We consider the local error estimate of the L1 scheme on graded mesh for a linearized time fractional KdV equation with weakly singular solutions, where Legendre Petrov-Galerkin spectral method is used for the spatial discretization. Stability and convergence of the fully discrete scheme are rigorously established, and the pointwise-in-time error estimates are given to show that one can attain the optimal convergence order 2 - alpha in positive time by mildly choosing the grading parameter r no more than 2 for all 0 < alpha < 1. Numerical results are presented to show that the error estimate is sharp. (c) 2022 IMACS. Published by Elsevier B.V. All rights reserved.