The concept of very weak solution introduced by Giga (1981) for the stationary Stokes equations has been intensively studied in the last years for the stationary Navier-Stokes equations. We give here a new and simpler proof of the existence of very weak solution for the stationary Navier-Stokes equations, based on density arguments and an adequate functional framework in order to define more rigorously the traces of non-regular vector fields. We also obtain regularity results in fractional Sobolev spaces. All these results are obtained in the case of a bounded open set, connected of class C1, 1 of R3 and can be extended to the Laplace's equation and to other dimensions. © 2010 Académie des sciences.