A sufficient integral condition for local regularity of solutions to the surface growth model

Abstract

The surface growth model, ut + uxxxx + ∂xx ux2 =0, is a one-dimensional fourth order equation, which shares a number of striking similarities with the three-dimensional incompressible Navier--Stokes equations, including the results regarding existence and uniqueness of solutions and the partial regularity theory. Here we show that a weak solution of this equation is smooth on a space-time cylinder Q if the Serrin condition ux∈ Lq'Lq (Q) is satisfied, where q,q'∈ [1,∞ ] are such that either 1/q+4/q'<1 or 1/q+4/q'=1, q'<∞.