Litcius/Paper detail

Generalized Hydrodynamics: A Perspective

Benjamin Doyon, Sarang Gopalakrishnan, Frederik Møller, Jörg Schmiedmayer, Romain Vasseur

2025Physical Review X39 citationsDOIOpen Access PDF

Abstract

Conventional hydrodynamics describes systems with few long-lived excitations. In one dimension, however, many experimentally relevant systems feature a large number of long-lived excitations and conserved quantities even at high temperature, because they are proximate to integrable limits. Such models cannot be treated using conventional hydrodynamics. The framework of generalized hydrodynamics (GHD) was recently developed to treat the dynamics of one-dimensional models: It combines ideas from integrability, hydrodynamics, and kinetic theory to come up with a quantitative theory of transport. GHD has successfully settled several long-standing questions about one-dimensional transport; it has also been leveraged to study dynamical questions beyond the transport of conserved quantities and to systems that are not integrable. In this article, we introduce the main ideas and predictions of GHD, survey some of the most recent theoretical extensions and experimental tests of the GHD framework, and discuss some open questions in transport that the GHD perspective might elucidate.

Topics & Concepts

Integrable systemPerspective (graphical)Statistical physicsPhysicsDimension (graph theory)Dynamical systems theoryTransport theoryTheoretical physicsClassical mechanicsComputer scienceMathematical physicsMathematicsQuantum mechanicsArtificial intelligencePure mathematicsQuantum many-body systemsCold Atom Physics and Bose-Einstein CondensatesModel Reduction and Neural Networks