Stabilizing relativistic fluids on spacetimes with non-accelerated expansion

Abstract

We establish global regularity and stability for the irrotational relativistic Euler equations with equation of state p=K, where 0<K<1/3, for small initial data in the expanding direction of FLRW spacetimes of the form ( R× T3,-d2+2δij dxi dxj). This provides the first case of non-dust fluid stabilization by spacetime expansion where the expansion rate is of power law type but non-accelerated. In particular, the time integral of the inverse scale factor diverges as t→∞.