Abstract
Aim of this paper is to take the first steps in the study of the Schrodinger problem for lattice gases (SPLG), which we formulate relying on classical results in large deviations theory. Our main contributions are a dynamical characterization of optimizers through a coupled system of PDEs and a precise study of the evolution and convexity of the quasi-potential along Schrodinger bridges. In particular, our computations show that, although SPLG does not admit a variational interpretation through Otto calculus, the fundamental geometric properties of the classical Schrodinger problem for independent particles still admit a natural generalization. These observations motivate the development of a Riemannian calculus on the space of probability measures associated with the class of geodesic distances studied in [3]. All our computations are formal, further efforts are needed to turn them into rigorous results.
Lingua originale | English |
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Titolo della pubblicazione ospite | Lecture Notes in Computer Science (including subseries Lecture Notes in Artificial Intelligence and Lecture Notes in Bioinformatics) - 5th International Conference on Geometric Science of Information, GSI 2021 |
Pagine | 891-899 |
Numero di pagine | 9 |
Volume | 12829 LNCS |
DOI | |
Stato di pubblicazione | Pubblicato - 2021 |
Evento | 5th International Conference on Geometric Science of Information, GSI 2021 - PARIGI Durata: 21 lug 2021 → 23 lug 2021 |
Convegno
Convegno | 5th International Conference on Geometric Science of Information, GSI 2021 |
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Città | PARIGI |
Periodo | 21/7/21 → 23/7/21 |
Keywords
- Displacement convexity
- Gamma calculus
- Large deviations
- Non-linear mobility
- Optimal transport
- Schrodinger problem