What are the "applications" of quantum optimal transport?

Question

A quantum version of the Monge-Kantorovich optimal transport problem aims at optimizing a Hermitian cost matrix $C$ over the set of all bipartite coupling states $\rho_{AB}$, s.t. both of its reduced density matrices $\rho_A$ and $\rho_B$ are fixed. I'm interested in its "applications". The classical optimal transport theory can be either used as theoretical tools to study important problems arising in PDE (Schrödinger equation/e Boltzmann equation), metric geometry, random matrices, etc., or used to study problems in practice, e.g. urban planning, economics, data science, etc. So I wish to know whether the quantum optimal transport has similar relevance, from both theoretical and practical perspective.

Any answer, references (survey summarizing its development) and comments are highly appreciated.

PS : Thanks for GJC's comment. I've found some related articles :

https://arxiv.org/pdf/2105.06922.pdf

https://arxiv.org/pdf/1908.01829.pdf

while I still look for such a summary of this field.

Answer 1

This paper by De Palma et. al. https://ieeexplore.ieee.org/abstract/document/9420734 provides a series of possible applications in the Future perspective section:

• Quantum State Estimation
• Robustness of Quantum Machine Learning
• Quantum Generative Adversarial Networks
• Quantum Rate Distortion Theory
• Quantum Differential Privacy
• Mixing time of Quantum Markov Semigroups
• Shallow Quantum Circuits
• Quantum Many-Body Hamiltonians

Also in their other paper https://link.springer.com/article/10.1007/s00023-021-01042-3 implicitly mentioned some of the applications referring to its citations [4-9]:

• "the study of partial differential equations, by interpreting many evolution equations as gradient flows with respect to transport-induced metrics [4];
• geometric analysis, with quantitative isoperimetric inequalities [5] and synthetic notions of Ricci curvature bounds [6,7];
• stochastic analysis in infinite dimensions [8];
• random combinatorial optimization problems [9];
• statistics and machine learning [10]."

Although in this second paper none of them are specific applications of the quantum optimal transport but their claim is that it will be a useful tool to address the quantum version of the above problems.

There is also the paper https://arxiv.org/abs/1906.09817 by Ikeda which provides applications for its quantum optimal transport problem by transforming some of these quantum problems into quantum optimal transport:

• Costly Quantum Walk
• Quantum Cellular Auto
• Automata and Games
• Repeated Quantum Games

I just listed the above items as mentioned in papers. Please look into it further yourself for proper evaluation. Hope it helps.