Papers
Topics
Authors
Recent
Search
2000 character limit reached

The Case Against Smooth Null Infinity II: A Logarithmically Modified Price's Law

Published 17 May 2021 in gr-qc, hep-th, math-ph, math.AP, math.DG, and math.MP | (2105.08084v2)

Abstract: In this paper, we expand on results from our previous paper "The Case Against Smooth Null Infinity I: Heuristics and Counter-Examples" [1] by showing that the failure of "peeling" (and, thus, of smooth null infinity) in a neighbourhood of $i0$ derived therein translates into logarithmic corrections at leading order to the well-known Price's law asymptotics near $i+$. This suggests that the non-smoothness of $\mathcal{I}+$ is physically measurable. More precisely, we consider the linear wave equation $\Box_g \phi=0$ on a fixed Schwarzschild background ($M>0$), and we show the following: If one imposes conformally smooth initial data on an ingoing null hypersurface (extending to $\mathcal{H}+$ and terminating at $\mathcal{I}-$) and vanishing data on $\mathcal{I}-$ (this is the no incoming radiation condition), then the precise leading-order asymptotics of the solution $\phi$ are given by $r\phi|{\mathcal{I}+}=C u{-2}\log u+\mathcal{O}(u{-2})$ along future null infinity, $\phi|{r=R>2M}=2C\tau{-3}\log\tau+\mathcal{O}(\tau{-3})$ along hypersurfaces of constant $r$, and $\phi|{\mathcal{H}+}=2Cv{-3}\log v+\mathcal{O}(v{-3})$ along the event horizon. Moreover, the constant $C$ is given by $C=4M I_0{(\mathrm{past})}[\phi]$, where $I_0{(\mathrm{past})}[\phi]:=\lim{u\to -\infty} r2\partial_u(r\phi_{\ell=0})$ is the past Newman--Penrose constant of $\phi$ on $\mathcal{I}-$. Thus, the precise late-time asymptotics of $\phi$ are completely determined by the early-time behaviour of the spherically symmetric part of $\phi$ near $\mathcal{I}-$. Similar results are obtained for polynomially decaying timelike boundary data. The paper uses methods developed by Angelopoulos--Aretakis--Gajic and is essentially self-contained.

Summary

No one has generated a summary of this paper yet.

Paper to Video (Beta)

No one has generated a video about this paper yet.

Whiteboard

No one has generated a whiteboard explanation for this paper yet.

Open Problems

We haven't generated a list of open problems mentioned in this paper yet.

Continue Learning

We haven't generated follow-up questions for this paper yet.

Collections

Sign up for free to add this paper to one or more collections.