Emmrich, Etienne2021-12-172021-12-172002-08-012197-8085https://depositonce.tu-berlin.de/handle/11303/15463http://dx.doi.org/10.14279/depositonce-14236The incompressible Navier-Stokes problem is discretised in time by the two-step backward differentiation formula with constant step sizes. Error estimates are proved under feasible assumptions on the regularity of the exact solution. The question of compatibility of problem data is taken into account. Whereas the time-weighted velocity error is of optimal second order in the $l^{\infty}(L^2)$- and $l^2(H_0^1)$-norm, the time-weighted error in the pressure is of first order in the $l^{\infty}(L^2/\mathbbm{R})$-norm. Furthermore, a linearisation that is based upon a modification of the convective term using a formally second-order extrapolation is considered. The velocity error is then shown to be of order $3/2$, and the pressure error is of order $1/2$. The results presented cover both the two- and three-dimensional case. Particular attention is directed to appearing constants and step size restrictions.en510 Mathematikincompressible Navier-Stokes equationtime discretisationbackward differentiation formulaerror estimateparabolic smoothingResearch Paper