The Cauchy-Riemann equations in complex manifolds
The Cauchy-Riemann equations in complex manifolds
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Mei-Chi Shaw, University of Notre Dame
Fine Hall 314
In this talk we will discuss the Cauchy-Riemann equations on domains in complex manifolds with positive or negative curvature. We will also report some recent new results on the $L^2$ closed range property for $\bar{\partial}$ on an annulus between two pseudoconvex domains, when the inner domain is not smooth. In particular, we show the Hausdor property of the $L^2$ Dolbeault cohomology group on a domain between a ball and a bi-disc, the so-called Chinese Coin problem. We also give characterizaation of Lipschitz domains with holes through their Dolbeault cohomology groups. (joint work with Debraj Chakrabarti, Siqi Fu, and Christine Laurent-Thiebaut).