S1-equivariant index theorems and Morse inequalities on complex manifolds with b
报告人:邵国宽,台湾“中央”研究院数学所 时间:2018年9月26日(周三)下午15:30
报告题目: S1-equivariant index theorems and Morse inequalities on complex manifolds with boundary
报告人:邵国宽,台湾“中央”研究院数学所
时间:2018年9月26日(周三)下午15:30
地点:行健楼学术活动室526
邀请人:黄益 博士
报告摘要:In this talk, we will present new versions of index theorems and Morse inequalities on complex manifolds with boundary. Let M be a relatively compact open subset with connected smooth boundary X of a complex manifold M'. Assume that M admits a holomorphic S1-action preserving the boundary X and the S1-action is transversal and CR on X. We claim that the m-th Fourier component of the q-th Dolbeault cohomology group  H^q_m(overline M) is of finite dimension. By using Poisson operator, we prove a reduction theorem which shows that the formulas about  H^q_m(overline M) in our main theorems involve only integrations over X. This talk is based on the joint work with Chin-Yu HSIAO, Rung-Tzung HUANG and Xiaoshan LI.