Bounds on outputs of the exact weak solution of the three-dimensional Stokes problem

This paper examines the stability of nontrivial regular solutions to the Navier Stokes equations on a three dimensional torus. It is shown that the W 2, 1 r -norm of the perturbation can be controlled if its initial data are small enough in the L 2 -norm. A key element of the proof is to apply the M

A finite element technique is presented for the efficient generation of lower and upper bounds to outputs which are linear functionals of the solutions to the incompressible Stokes equations in two space dimensions. The finite element discretization is effected by Crouzeix -Raviart elements, the dis

## Abstract The forward problem of electrical impedance tomography on unbounded domains can be studied by introducing appropriate function spaces for this setting. In this paper we derive the point‐wise asymptotic behaviour of weak solutions to this problem in the three‐dimensional case. Copyright

hud the opfiortunity of learning 9ure mathematics from him. Now I have had to learn mathematics again in order to understand our joilzt paper which m y good friend, C. C. L A , and myself dedicate to this volume honoring Kurt Friedrichs. M a y I take this occasion to express m y sincere gratitude an