Abstract
In this note, we present a unified approach to the problem of existence of a potential for the optimal transport problem with respect to non-traditional cost functions, that is costs that assume infinite values. We establish a new method which relies on proving solvability of a special (possibly infinite) family of linear inequalities. We give a necessary and sufficient condition on the coefficients that assure the existence of a solution, and which in the setting of transport theory we call c-path-boundedness. This condition fully characterizes sets that admit a potential and replaces c-cyclic monotonicity from the classical theory, i.e. when the cost is real-valued. Our method also gives a new and elementary proof for the classical results of Rockafellar, Rochet and Rüschendorf.
Original language | English |
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Article number | 108157 |
Journal | Advances in Mathematics |
Volume | 395 |
DOIs | |
State | Published - 22 Jan 2022 |
Keywords
- Existence of a potential
- Optimal transport
- Rockafellar-type theorem
- c-cyclic monotonicity
- c-path-boundedness
All Science Journal Classification (ASJC) codes
- General Mathematics