Integral representation and supports of functionals on Lipschitz spaces

Abstract

We analyze the relationship between Borel measures and continuous linear functionals on the space Lip0(M) of Lipschitz functions on a complete metric space M. In particular, we describe continuous functionals arising from measures and vice versa. In the case of weak continuous functionals, i.e. members of the Lipschitz-free space F(M), measures on M are considered. For the general case, we show that the appropriate setting is rather the uniform (or Samuel) compactification of M and that it is consistent with the treatment of F(M). This setting also allows us to give a definition of support for all elements of Lip0(M) with similar properties to those in F(M), and we show that it coincides with the support of the representing measure when such a measure exists. We deduce that the members of Lip0(M) that can be expressed as the difference of two positive functionals admit a Jordan-like decomposition into a positive and a negative part.