Global-in-time H1-stability of L2-1σ method on general nonuniform meshes for subdiffusion equation

Abstract

In this work the L2-1σ method on general nonuniform meshes is studied for the subdiffusion equation. When the time step ratio is no less than 0.475329, a bilinear form associated with the L2-1σ fractional-derivative operator is proved to be positive semidefinite and a new global-in-time H1-stability of L2-1σ schemes is then derived under simple assumptions on the initial condition and the source term. In addition, the sharp L2-norm convergence is proved under the constraint that the time step ratio is no less than 0.475329.