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Abstract: Stepanov differentiability theorem is a generalization of the classical Rademacher's Theorem for Lipschitz functions between
Euclidean spaces. I will present an extension of this result in the Subriemannian setting of Heisenberg groups, using the intrinsic notions of Lipschitz continuity and differentiability introduced by Franchi, Serapioni, and Serra Cassano. This result is based on (and extends) the corresponding Rademacher's theorem recently proved by
Vittone.  Joint work with M. Di Marco, D. Vittone and A. Pinamonti.