A class of solutions to stationary Stokes and Navier-Stokes equations with boundary data inW−1/q,q

## Abstract We establish the wellposedness of the time‐independent Navier–Stokes equations with threshold slip boundary conditions in bounded domains. The boundary condition is a generalization of Navier's slip condition and a restricted Coulomb‐type friction condition: for wall slip to occur the m

We construct a class of weak solutions to the Navier᎐Stokes equations, which have second order spatial derivatives and one order time derivatives, of p power s Ž 2, r Ž .. summability for 1p F 5r4. Meanwhile, we show that u g L 0, T ; W ⍀ with 1rs q 3r2 r s 2 for 1r F 5r4. r can be relaxed not to ex

We consider the 3D Navier-Stokes equation with generalized impermeability boundary conditions. As auxiliary results, we prove the local in time existence of a strong solution ('strong' in a limited sense) and a theorem on structure. Then, taking advantage of the boundary conditions, we formulate suf

We prove a theorem on stability of a strong solution of the Navier-Stokes equation with respect to perturbation of the initial velocity in the norm of D(A 1/4 ) (where A is the Stokes operator) and also with respect to certain perturbations of the acting body force. The theorem is applied to obtain