Hydrodynamics, resurgence and trans-asymptotics

TL;DR

This paper investigates the resurgent asymptotic properties of a second-order hydrodynamical model for a conformal plasma undergoing boost-invariant expansion, revealing the organization of non-hydrodynamic modes via trans-series and their relation to initial conditions.

Contribution

It develops a trans-series framework for hydrodynamics, identifying non-hydrodynamic modes and their resurgence properties, extending previous work on hydrodynamical resummation techniques.

Findings

Identification of non-hydrodynamic modes as exponentially suppressed in late times.

Explicit relations between fluctuations of different non-hydrodynamic modes.

Connection of the trans-series parameters to initial conditions and Stokes constants.

Abstract

The second-order hydrodynamical description of a homogeneous conformal plasma that undergoes a boost- invariant expansion is given by a single nonlinear ordinary differential equation, whose resurgent asymptotic properties we study, developing further the recent work of Heller and Spalinski [Phys. Rev. Lett. 115, 072501 (2015)]. Resurgence clearly identifies the non-hydrodynamic modes that are exponentially suppressed at late times, analogous to the quasi-normal-modes in gravitational language, organizing these modes in terms of a trans-series expansion. These modes are analogs of instantons in semi-classical expansions, where the damping rate plays the role of the instanton action. We show that this system displays the generic features of resurgence, with explicit quantitative relations between the fluctuations about different orders of these non-hydrodynamic modes. The imaginary part of the trans-series parameter is identified with the Stokes constant, and the real part with the freedom associated with initial conditions.