Hölder Continuity of Local Minimizers

By means of the Minkowski function we define a new concept of local Holder Ž . equicontinuity respectively local Holder continuity for families consisting of Ž . set-valued mappings respectively for set-valued mappings between topological linear spaces. The connection between this new concept and t

The generalized Hamiltonian flow F generated by a smooth function on a t symplectic manifold S with smooth boundary Ѩ S is considered. It is proved that if F has no tangencies of infinite order to Ѩ S, then given a metric d on S, an integral t Ž . Ž . curve t of F , a compact neighbourhood K of 0 i

We prove that the semi-conjugacy, obtained by P. Arnoux (1988, Bull. Soc. Math. France 116, 489-500), between an interval exchange map and a translation on the torus is Hölder continuous and we compute the Hölder exponent. This semiconjugacy is a particular case of a space filling curve.