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 μ=Σn λn δxn-δynd(xn,yn) such that \|μ\|=Σn |λn |. We characterise these elements in terms of geometric conditions on the points xn, yn 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.