报告人:李波 嘉兴大学
报告时间:6月6日(周五下午),16:30-17:30
报告地点:理C220
报告摘要:In the paper [Sci. China Math, 2022] of Jiang-Li, the authors characterized the BMO function by a Carleson measure condition of its harmonic extension $(-\partial^2_t-\Delta+V) u=0$ on the Dirichlet metric measure space, where the non-negative potential $V$ is in the $(n+1)/2$-reverse Hölder class. This talk is concerned with the similar problem under a more critical case: the $n/2$-reverse Hölder class. This is a joint work with Ji Li and Liangchuan Wu.
报告人简介:
李波,博士,硕士生导师。主讲《泛函分析》《线性代数》等课程,指导学生国家级创新项目1项。主要从事调和分析与偏微分方程的研究,主持省部级以上项目2项,嘉兴市青年科技人才专项1项。在《Sci. China Math.》、《J. Differential Equation》、《J. Geom. Anal.》《Nagoya Math. J.》等期刊发表论文20余篇,其中SCI二区5篇。
