On the Automorphism Group of the Kohn–Nirenberg Domain

Here we give a self-contained new proof of the partial regularity theorems for solutions of incompressible Navier-Stokes equations in three spatial dimensions. These results were originally due to Scheffer and Caffarelli, Kohn, and Nirenberg. Our proof is much more direct and simpler.

Let A be the automorphism group of the one-rooted regular binary tree T and 2 G the subgroup of A consisting of those automorphisms admitting a ''finite Ž . description'' in their action on T . Let N G be the normaliser of G in A, let 2 A Ž . Ž . Aut G be the group of automorphisms of G, and let End

Let K be a finite field of characteristic p ≥ 5. The Nottingham group over K is the group of normalised automorphisms of the local field K t . In this paper we determine the automorphism group of ; in particular we show that every automorphism of the Nottingham group is standard. We also give a comp