Points of differentiability of the norm in Lipschitz-free spaces

Abstract: We consider convex series of molecules in Lipschitz-free spaces, i.e. elements of the form $\mu=\sum_n \lambda_n \frac{\delta_{x_n}-\delta_{y_n}}{d(x_n,y_n)}$ such that $|\mu|=\sum_n |\lambda_n |$. We characterise these elements in terms of geometric conditions on the points $x_n$, $y_n$ of the underlying metric space, and determine when they are points of G^ateaux differentiability of the norm. In particular, we show that G^ateaux and Fr\'echet differentiability are equivalent for finitely supported elements of Lipschitz-free spaces over uniformly discrete and bounded metric spaces, and that their tensor products with G^ateaux (resp. Fr\'echet) differentiable elements of a Banach space are G^ateaux (resp. Fr\'echet) differentiable in the corresponding projective tensor product.