Pure and Applied Mathematics Quarterly

Volume 20 (2024)

Number 4

Derivation of the half-wave maps equation from Calogero–Moser spin systems

Pages: 1825 – 1858

DOI: https://dx.doi.org/10.4310/PAMQ.2024.v20.n4.a10

Authors

Enno Lenzmann (Department of Mathematics and Computer Science, University of Basel, Basel, Switzerland)

Jérémy Sok (Department of Mathematics and Computer Science, University of Basel, Basel, Switzerland)

Abstract

We prove that the energy-critical half-wave maps equation\[$\partial_t \mathbf {S} = \mathbf {S} \times |\nabla |\mathbf {S}, \quad (\mathit{t}, \mathit{x}) \in \mathbb R \times \mathbb T$\]arises as an effective equation in the continuum limit of completely integrable Calogero–Moser classical spin systems with inverse square $1/r^2$ interactions on the circle. We study both the convergence to global-in-time weak solutions in the energy class as well as short-time strong solutions of higher regularity. The proofs are based on Fourier methods and suitable discrete analogues of fractional Leibniz rules and Kato–Ponce–Vega commutator estimates.

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Dedicated to Demetrios Christodoulou with great admiration

Received 29 March 2022

Received revised 17 August 2022

Accepted 4 September 2022

Published 18 July 2024