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We prove that given a locally integrable function f on an open set of an Euclidean space the distributional derivative Xf with respect to a locally Lipshitzian vector field X is locally integrable if, and only if, the function f admits a locally integrable upper gradient along the vector field X; in this case Xf coincides with the Lie derivative LX f and |Xf| is the least upper gradient of the function f. Applications to systems of locally Lipshitzian vector fields are given.
Sergio Venturini (Tue,) studied this question.