Knowledge Resource Center for Ecological Environment in Arid Area
| 项目编号 | 1815079 |
| Imperfect Patterns-Existence, Stability, and Essential Spectrum | |
| Qiliang Wu | |
| 主持机构 | Ohio University |
| 开始日期 | 2018-08-01 |
| 结束日期 | 2021-07-31 |
| 资助经费 | 125011(USD) |
| 项目类别 | Continuing Grant |
| 资助机构 | US-NSF(美国国家科学基金会) |
| 项目所属计划 | APPLIED MATHEMATICS |
| 语种 | 英语 |
| 国家 | 美国 |
| 英文简介 | How do zebras get their stripes? How do cell membranes get their shapes and keep from bursting into pieces? These two seemingly disconnected scientific topics can actually be investigated via a general mathematical framework outlined within this project. Such a study not only applies to the specific topics above, but also to any physical systems arising from similar mathematical models, such as sand patterns in deserts, cloud patterns in the sky, cell fission/fusion processes, cast ionomers in solar cells, and network morphology in soapy water. The aim of this project is to systematically understand imperfections of patterns, which are ubiquitous in nature and pivotal in various scientific settings and technical applications. The investigator studies defects in periodic patterns, with an application to understanding the development of grain boundaries in materials; he also studies defects in bilayers such as arise in cell membranes. Part of the project includes research experience opportunities for undergraduate students. The investigator applies dynamical systems techniques, combined with functional analysis, differential geometry, asymptotic analysis, and large deviation theory, to study pattern formation, with an emphasis on the role of the essential spectrum in the formation and stability of defects of periodic patterns and bilayer interfaces. The most interesting and challenging case occurs when the essential spectrum touches the origin; here he seeks explicit illustrations of formation mechanisms of stripe patterns, amphiphilic structures, and their imperfections. The classical Swift-Hohenberg equation provides a prototype for rigorous studies of periodic patterns. Firstly, the imperfections of periodic patterns to instantaneous, constant, and random perturbations are investigated. Secondly, in the case of instability, the local biases and the rotational symmetry of the system together give rise to various line and point defects, such as grain boundaries, dislocations, and disclinations. The investigator studies grain boundaries, providing a novel functional analytical machinery to construct deformed patterns. He also investigates defects of amphiphilic morphology in the functionalized Cahn-Hilliard FCH) setting, suggesting mechanisms of the formation of lipid rafts, end caps and Y-junctions. Here the essential spectrum of the linearized operator at bilayer interfaces is continuous up to the origin but is not "simple." It serves as a benchmark for understanding the role of essential spectra. Part of the project includes research experience opportunities for undergraduate students. This award reflects NSF's statutory mission and has been deemed worthy of support through evaluation using the Foundation's intellectual merit and broader impacts review criteria. |
| 来源学科分类 | Mathematical and Physical Sciences |
| URL | https://www.nsf.gov/awardsearch/showAward?AWD_ID=1815079 |
| 资源类型 | 项目 |
| 条目标识符 | http://119.78.100.177/qdio/handle/2XILL650/342959 |
| 推荐引用方式 GB/T 7714 | Qiliang Wu.Imperfect Patterns-Existence, Stability, and Essential Spectrum.2018. |
| 条目包含的文件 | 条目无相关文件。 | |||||
| 个性服务 |
| 推荐该条目 |
| 保存到收藏夹 |
| 导出为Endnote文件 |
| 谷歌学术 |
| 谷歌学术中相似的文章 |
| [Qiliang Wu]的文章 |
| 百度学术 |
| 百度学术中相似的文章 |
| [Qiliang Wu]的文章 |
| 必应学术 |
| 必应学术中相似的文章 |
| [Qiliang Wu]的文章 |
| 相关权益政策 |
| 暂无数据 |
| 收藏/分享 |
除非特别说明,本系统中所有内容都受版权保护,并保留所有权利。
