题目：Reconstruction of image via Riemann-Hilbert problems on discretehalf lattices

内容简介：The Riemann-Hilbert problem on the Hardy space is one of the classic topics incomplex analysis of one complex variable. The question of finding an analytic function, whoseboundary belongs to a Hardy space, by its boundary values connects to many problems incontinuum mechanics, in hydrodynamics or in materials with memory. Its solvability in theframework of the classical complex analysis was studied in the classical papers of F.D. Gakhov,I.N. Vekua, N.I. Mishkelishvili, B.V. Khvedekidze, D.A. Kveselava and others. Nowadays it hasbeen extended to three dimensional cases by making full use of the Clifford analysis. Thesethreedimensional Riemann-Hilbert problems are linked not only to problems from the continuum mechanics, but also to other areas like the image reconstruction in three dimensionalspaces, where the notion of monogenic signal corresponds to the solutions of a Riemann-Hilbertproblem on a Hardy space. In this presentation, we focus on the Riemann-Hilbert problems ona Hadrdy space on half discrete lattices. We first introduce discrete monogenic functions. Thenwe define the corresponding Hardy spaces on half lattices. Afterwards, we derive the solutionsto the Riemann-Hilbert problems in terms of the discrete Cauchy transforms for the Hardyclass on the upper and lower discrete half spaces. Finally, we prove theirconvergence to thoseof the corresponding continuous Riemann-Hilbert boundary value problems.

报告人：荷兰拉德堡德大学(University of Radboud)库敏研究员

报告人简介：荷兰拉德堡德大学(University of Radboud)计算科学系和葡萄牙阿威罗大学(University of Aveiro)数学系双聘研究员，是复分析和Clifford分析领域杰出的青年学者，在国际上一些重要的数学期刊上发表30多篇研究论文。

时间：2019年5月14日（周二）下午3：00始

地点：南海楼330室

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2019年5月10日