Formulas for the h-mass on 1-currents with coefficients in Rm
Abstract
We consider the minimization of the h-mass over normal 1-currents in Rn with coefficients in Rm and prescribed boundary. This optimization is known as multi-material transport problem and used in the context of logistics of multiple commodities, but also as a relaxation of nonconvex optimal transport tasks such as so-called branched transport problems. The h-mass with norm h can be defined in different ways, resulting in three functionals Mh,|·|H, and Mh, whose equality is the main result of this article: Mh is a functional on 1-currents in the spirit of Federer and Fleming, norm |·|H denotes the total variation of a Radon measure with respect to H induced by h, and Mh is a mass on flat 1-chains in the sense of Whitney. On top we introduce a new and improved notion of calibrations for the multi-material transport problem: we identify calibrations with (weak) Jacobians of optimizers of the associated convex dual problem, which yields their existence and natural regularity.
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