A comparison principle for variational problems : with an application to optimal transport

We study variational problems on Banach spaces which involve submodular energies. We extend the notion of exchangeability to this infinite dimensional setting and show that it is in duality with submodularity. These two notions allow us to derive comparison principle in an abstract fashion. We apply our results to the optimal transport and entropic optimal transport problems. We then derive comparison principles on the Kantorovich and Schrödinger potentials. We also prove comparison principles for the associated JKO schemes.