A class of De Giorgi type and Hölder continuity

This work focuses on the local Hölder exponent as a measure of the regularity of a function around a given point. We investigate in detail the structure and the main properties of the local Hölder function (i.e., the function that associates to each point its local Hölder exponent). We prove that it

## Abstract Let Ω~1~ and Ω~2~ be bounded, connected open sets in \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$\mathbb {R}^N$\end{document} with continuous boundary, and let __p__ > 2. We show that every positive linear isometry __T__ from __W__^1, __p__^(Ω~1~) to __W

## Abstract We prove __C__^0, α^ regularity for local minimizers __u__ of functionals with __p__(__x__)‐growth of the type in the class \documentclass{article}\usepackage{amssymb}\begin{document}\pagestyle{empty}$K :=\lbrace w \in W^{1,p(\cdot )}(\Omega ;{\mathbb R}): w \ge \psi \rbrace$\end{docum