Litcius/Paper detail

Hydrodynamic gradient expansion in linear response theory

Michał P. Heller, Alexandre Serantes, Michał Spaliński, Viktor Svensson, Benjamin Withers

2021Physical review. D/Physical review. D.41 citationsDOIOpen Access PDF

Abstract

A foundational question in relativistic fluid mechanics concerns the properties of the hydrodynamic gradient expansion at large orders. We establish the precise conditions under which this gradient expansion diverges for a broad class of microscopic theories admitting a relativistic hydrodynamic limit, in the linear regime. Our result does not rely on highly symmetric fluid flows utilized by previous studies of heavy-ion collisions and cosmology. The hydrodynamic gradient expansion diverges whenever energy density or velocity fields have support in momentum space exceeding a critical momentum and converges otherwise. This critical momentum is an intrinsic property of the microscopic theory and is set by branch point singularities of hydrodynamic dispersion relations.

Topics & Concepts

Gravitational singularityPhysicsMomentum (technical analysis)Classical mechanicsSpace (punctuation)Energy–momentum relationCritical point (mathematics)Limit (mathematics)CosmologyMathematical analysisMathematicsQuantum mechanicsFinancePhilosophyEconomicsLinguisticsCosmology and Gravitation TheoriesHigh-Energy Particle Collisions ResearchBlack Holes and Theoretical Physics