Valentino Magnani, Andrea Pinamonti, Gareth Speight
Published 2017-06-06Version 1
Let $f$ be a Lipschitz map from a subset $A$ of a stratified group to a Banach homogeneous group. We show that directional derivatives of $f$ act as homogeneous homomorphisms at density points of $A$ outside a $\sigma$-porous set. At density points of $A$ we establish a pointwise characterization of differentiability in terms of directional derivatives. We use these new results to obtain an alternate proof of almost everywhere differentiability of Lipschitz maps from subsets of stratified groups to Banach homogeneous groups satisfying a suitably weakened Radon-Nikodym property. As a consequence we also get an alternative proof of Pansu's Theorem.
Continuity of extensions of Lipschitz maps
Geometric logarithmic-Hardy and Hardy-Poincaré inequalities on stratified groups
On directional derivatives of trace functionals of the form $A\mapsto\Tr(Pf(A))$
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