We show that for a metric space with an even number of points there is a 1-Lipschitz map to a tree-like space with the same matching number. This result gives the first basic version of an unoriented Kantorovich duality. The study of the duality gives a version of global calibrations for 1-chains with coefficients in Z₂. Finally we extend the results to infinite metric spaces and present a notion of "matching dimension'' which arises naturally.

The first author was supported by the Fondation des Sciences Mathématiques de Paris and the second author was supported by the Swiss National Science Foundation.