Simplified 𝐿^{∞} estimates for difference schemes for partial differential equations

Abstract: Abstract.L°° estimates for one-step difference approximations to the Cauchy problem for du/dt = du/dx are proven by means of simple L2-techniques. It is shown that, provided the difference approximation is stable in L2 (and not necessarily L°°) and accurate of order r. the error in approximating smooth solutions is 0(hr). This has been proven by Hedstrom and Thomée using Fourier multipliers and Besov spaces. The present paper shows how convergence rates in U° can be recovered using simple techniques (such as t… Show more

On the behavior over long time intervals of finite difference and finite element approximations to first order hyperbolic systems

On the behavior over long time intervals of finite difference and finite element approximations to first order hyperbolic systems

Error estimates for finite difference approximations to hyperbolic equations for large time