A study of defect-based error estimates for the Krylov approximation of $φ$-functions

Abstract: Prior recent work, devoted to the study of polynomial Krylov techniques for the approximation of the action of the matrix exponential e tA v, is extended to the case of associated ϕ-functions (which occur within the class of exponential integrators). In particular, a posteriori error bounds and estimates, based on the notion of the defect (residual) of the Krylov approximation are considered. Computable error bounds and estimates are discussed and analyzed. This includes a new error bound which favorably compa… Show more