The hydrodynamic approximation of the semiclassical dissipation kernel in stochastic gravity

TL;DR

This paper develops a hydrodynamic approximation for the dissipation kernel in semiclassical stochastic gravity, enabling better modeling of structure formation and dissipation in effective fluids during the early universe.

Contribution

It introduces a novel hydrodynamic approximation for the dissipation kernel, extending semiclassical stochastic gravity to include effective fluid dissipation modeling.

Findings

Established a hydrodynamic approximation for the dissipation kernel.

Linked semiclassical fields with effective fluid dissipation models.

Facilitated analysis of structure formation around the decoherence era.

Abstract

Semiclassical stochastic gravity is aimed at studying extended structure formation in the early universe. Rigorous developments in this area include the semiclassical noise and dissipation kernels which are obtained in terms of quantum stress energy tensor composed of scalar fields. The present article forms an important step in an effort to extend the theory in the decoherence limit and hydrodynamic approximation of the scalar fields. Such extensions will make it possible to analyse the extended structure formation around the decoherence era of the inflaton field in cosmology. On the other hand, modelling dissipation in fluids and effective fluids is a challenge and long standing mathematical physics related hurdles have posed difficulties for progress in this direction.The present article marks the beginning of a new way to model dissipation in an effective fluid using the widely accepted correspondence between the semiclassical fields and effective fluid approximation. A similar approach has been recently carried out for noise (fluctuations) kernel correspondence between the two, we now touch upon dissipation in the relativistic effective fluids.