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数学物理及偏微分方程国际系列论坛(6): Scattering Theory of Linear and Nonlinear Waves: A Unified New Paradigm (I)

发布时间:2024-09-14 作者: 浏览次数:
Speaker: Avy Soffer DateTime: 2024年7月15日(周一) 上午8:00-9:00(北京时间)
Brief Introduction to Speaker:

 Avy Soffer,美国罗格斯大学数学系Rutgers University)杰出教授,美国数学会会士,主要从事数学物理与偏微方程的研究,其研究成果在Ann. Math., JAMS, Invent. Math. Duke J. Math.等国际著名期刊发表论文100余篇。学术上2006年在西班牙国际数学家大会上(ICM)作45分钟特邀报告,也曾担任GAFA杂志的编委,现为Letter in Math. Phy.杂志编委。

Place: Zoom link: https://rutgers.zoom.us/j/9316269301
Abstract:I will present a new approach to Mathematical Scattering of multichannel Dispersive and Hyperbolic Equations. In this approach we identify the large time behavior of such equations, both linear and non-linear, for general (large) data and interactions terms which can be space-time dependent. In particular, for the NLS equations with spherically symmetric data and Interaction terms, we prove that all global solutions in H^1 converge to a smooth and localized function plus a free wave, in 5 or more dimensions. Similar result holds for 3,4 dimensions, though the argument proving localization is different. We also show similar results in any dimension for localized type of interactions, provided they decay fast enough. We show breakdown of the standard Asymptotic Completeness conjecture if the interaction is time dependent and decays like r^{-2} at infinity. Many of these results extend to the non-radial case, for NLS, NLKG and Bi-harmonic NLS in three or more dimensions. Furthermore...