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The emergence of nonlinear Jeans-type instabilities for quasilinear wave equations

Published 4 Sep 2024 in math.AP | (2409.02516v2)

Abstract: This article contributes a key ingredient to the longstanding open problem of understanding the fully nonlinear version of Jeans instability, as highlighted by A. Rendall [Living Rev. Relativ. 8, 6 (2005)]. We establish a family of self-increasing blowup solutions for the following class of quasilinear wave equations (a model of the Peebles' and Noh-Hwang's equations) that have not previously been studied: [ \partial2_t \varrho- \biggl(\frac{ \mathsf{m}2 (\partial_{t}\varrho )2}{(1+\varrho )2} + 4(\mathsf{k}-\mathsf{m}2)(1+\varrho )\biggr) \Delta \varrho = F(t,\varrho,\partial_{\mu} \varrho) ] where $F$ is given by [ F(t,\varrho,\partial_{\mu} \varrho):= \underbrace{\frac{2}{3 } \varrho (1+\varrho) }{ \text{(i) self-increasing}} \underbrace{-\frac{1}{3} \partial{t}\varrho }{ \text{(ii) damping}} + \underbrace{\frac{4}{3} \frac{(\partial{t}\varrho )2}{1+\varrho } }{\text{(iii) Riccati}} + \underbrace{ \biggl(\mathsf{m}2 \frac{ (\partial{t}\varrho )2}{(1+\varrho )2} + 4(\mathsf{k}-\mathsf{m}2) (1+\varrho ) \biggr) qi \partial_{i}\varrho }{\text{(iv) convection}} - \mathtt{K}{ij} \partial{i}\varrho\partial_{j}\varrho. ] The result implies the solutions can attain arbitrarily large values over time, leading to self-increasing singularities at some future endpoints of null geodesics provided the inhomogeneous perturbations of data are sufficiently small. Moreover, the solution exhibits almost blowup behavior in the long-wavelength domain. This phenomenon is referred to as the nonlinear Jeans-type instability because this wave equation is closely related to the nonlinear version of the Jeans instability problem in the Euler-Poisson and Einstein-Euler systems, which characterizes the formation of nonlinear structures in the universe. The growth rate of $\varrho$ is significantly faster than that of the solutions to the classical linearized Jeans instability.

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