On long time behavior of the focusing energy-critical NLS on Rd×T via semivirial-vanishing geometry

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2023-09-01 DOI:10.1016/j.matpur.2023.07.006

Yongming Luo

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Abstract

We study the focusing energy-critical NLS(NLS) $i \partial_{t} u + Δ_{x, y} u = - | u |^{\frac{4}{d - 1}} u$ on the waveguide manifold $R_{x}^{d} \times T_{y}$ with $d \geq 2$ . We reveal the somewhat counterintuitive phenomenon that despite the energy-criticality of the nonlinear potential, the long time dynamics of (NLS) are purely determined by the semivirial-vanishing geometry which possesses an energy-subcritical characteristic. As a starting point, we consider a minimization problem $m_{c}$ defined on the semivirial-vanishing manifold with prescribed mass c. We prove that for all sufficiently large mass the variational problem $m_{c}$ has a unique optimizer $u_{c}$ satisfying $\partial_{y} u_{c} = 0$ , while for all sufficiently small mass, any optimizer of $m_{c}$ must have non-trivial y-dependence. Afterwards, we prove that $m_{c}$ characterizes a sharp threshold for the bifurcation of finite time blow-up ( $d = 2, 3$ ) and globally scattering ( $d = 3$ ) solutions of (NLS) in dependence of the sign of the semivirial. To the author's knowledge, the paper also gives the first large data scattering result for focusing NLS on product spaces in the energy-critical setting.

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基于半维里消失几何的Rd×T上聚焦能量临界非线性系统的长时间行为

我们研究了d≥2的波导流形Rxd×Ty上的聚焦能量临界NLS（NLS）iõtu+Δx，yu=−|u|4d−1u。我们揭示了一个有点违反直觉的现象，即尽管非线性势具有能量临界性，但（NLS）的长时间动力学完全由具有能量亚临界特性的半维里消失几何决定。作为一个起点，我们考虑了一个定义在具有指定质量c的半维里消失流形上的最小化问题mc。我们证明了对于所有足够大的质量，变分问题mc都有一个唯一的优化器uc，满足Şyuc=0，而对于所有足够小的质量，mc的任何优化器都必须具有非平凡的y依赖性。然后，我们证明了mc表征了（NLS）的有限时间爆破（d=2，3）和全局散射（d=3）解的分岔的一个尖锐阈值，该阈值依赖于半维里的符号。据作者所知，本文还给出了在能量临界环境下将NLS聚焦于乘积空间的第一个大数据散射结果。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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