CAREER: New Approaches to Mathematical Wave Turbulence

职业：数学波湍流的新方法

• 批准号: 1654692
• 负责人: Zaher Hani
• 金额: $ 42万
• 依托单位: Georgia Tech Research Corporation
• 依托单位国家: 美国
• 项目类别: Continuing Grant
• 财政年份: 2017
• 资助国家: 美国
• 起止时间: 2017-09-01 至 2019-07-31
• 项目状态: 已结题
• 来源: https://www.nsf.gov/awardsearch/showAward?AWD_ID=1654692&HistoricalAwards=false
• 关键词: CAREER; New; Approaches; Mathematical; Wave

Nonlinear dispersive equations model physical phenomena arising in quantum mechanics, plasma physics, nonlinear optics, oceanography, all the way to general relativity. The purpose of this project is to improve the mathematical and scientific understanding of those equations via A) concrete research projects aimed at studying the long-time behavior of solutions to such equations, and B) an educational component aimed at introducing such problems to a new and diverse generation of mathematicians. The main focus is on the study of the so-called "non-equilibrium behavior" of nonlinear dispersive equations. Such a behavior is exhibited in many physically important phenomena, like turbulence in ocean waves or in the transmission of optical signals, to mention only a couple. While this turbulence is easy to observe and has very strong manifestations in nature, its scientific understanding is rather poor and the mathematical justification of the involved phenomena based on the model equations is rather difficult and is mostly still open. This project is aimed at rigorously proving turbulence phenomenon for certain nonlinear dispersive models.The most important feature of the long-time behavior of nonlinear dispersive partial differential equations (PDE) on compact domains is out-of-equilibrium behavior or long-time instability. This means that solutions do not exhibit long-time stability near equilibriums solutions or configurations. Such questions can be addressed from a dynamical systems perspective and from a statistical physics perspective, in what is often called in the physics literature as "wave turbulence theory". The proposed projects address this broad problematic from both perspectives. In terms of dynamics, the aim is to construct solutions exhibiting the so-called "energy cascade" phenomenon, in which the energy of a dispersive system moves its concentration zone between characteristically different length scales. On the statistical physics perspective, projects aimed at justifying the fundamental equations of wave turbulence are proposed. These are effective equations for the dynamics that are derived in the physics literature from heuristic considerations, and have very important implications on the long-time behavior of dispersive PDE, provided they are rigorously justified. The project also includes an educational component aimed at raising the interest of a younger generation of researchers in those fundamental problems through workshops, seminars, REU projects, etc.

非线性色散方程模拟了量子力学、等离子体物理、非线性光学、海洋学中出现的物理现象，一直到广义相对论。这个项目的目的是通过A)旨在研究这些方程的解的长期行为的具体研究项目，以及B)旨在将这些问题介绍给新一代和多样化的数学家的教育部分，来提高对这些方程的数学和科学理解。主要研究了非线性色散方程的非平衡行为。这种行为表现在许多重要的物理现象中，比如海浪中的湍流或光信号的传输，仅举几例。虽然这种湍流很容易观察到，在自然界中有很强的表现，但它的科学认识相当差，根据模型方程对所涉及的现象进行数学证明是相当困难的，而且基本上仍然是开放的。本项目旨在严格证明某些非线性色散模型中的湍流现象。紧致区域上的非线性色散偏微分方程长时间行为的最重要特征是非平衡行为或长时间不稳定性。这意味着解决方案不会在平衡点、解决方案或配置附近表现出长期稳定性。这样的问题可以从动力系统的角度和统计物理的角度来解决，在物理学文献中通常被称为“波动湍流理论”。拟议的项目从两个角度解决了这一广泛的问题。在动力学方面，其目的是构建呈现所谓的“能量级联”现象的解，即色散系统的能量在不同的长度尺度之间移动其集中区。从统计物理的角度，提出了证明波浪湍流基本方程的方案。这些都是在物理学文献中从启发式考虑中得到的有效的动力学方程，并且对色散PDE的长期行为具有非常重要的影响，只要它们是严格证明的。该项目还包括一个教育部分，旨在通过讲习班、研讨会、REU项目等提高年轻一代研究人员对这些基本问题的兴趣。