Elastic rigid rod in an expanding universe

TL;DR

This paper investigates how a rigid elastic rod behaves in an expanding universe, showing that small rods oscillate while larger ones stretch infinitely, highlighting the scale-dependent response of bound systems to cosmic expansion.

Contribution

The study introduces a nonlinear wave equation model for an elastic rod in an expanding universe and analyzes the conditions for global boundedness versus finite-time blow-up.

Findings

Small rods oscillate around their initial length.

Large rods stretch infinitely in finite time.

Results support the idea that small systems resist cosmic expansion.

Abstract

We study the motion of a rigid elastic rod, initially set in its relaxed state along a spacelike geodesic, in an expanding Friedmann-Lema\^itre-Robertson-Walker universe. This leads to an initial boundary value problem (IBVP) for a nonlinear wave equation whose nonlinearity depends on a parameter $\kappa \geq 0$, related to the ratio between the rod's length and the cosmological scale. We show that if $\kappa$ is small enough then the solution to the IBVP is global in time and bounded, meaning that the rod's length oscillates around its initial value. For greater values of $\kappa$, however, the solution to the IBVP blows up in finite coordinate time, indicating that the rod is infinitely stretched by the cosmological expansion. This supports the widely held belief that sufficiently small bound systems do not follow the Hubble flow, whereas larger systems may do so. Similar conclusions apply to the tethered galaxy version of this problem, where the rod is used to connect two point masses (which results in nonlinear boundary conditions for the IBVP).