Let D be a bounded positive (m, p)-circle domain in Cu. The authors prove that if dim(Iso(D)^0) = 2, then D is holomorphically equivalent to a Reinhardt domain; if dim(Iso(D)^0)=4, then D is holomorphically ...Let D be a bounded positive (m, p)-circle domain in Cu. The authors prove that if dim(Iso(D)^0) = 2, then D is holomorphically equivalent to a Reinhardt domain; if dim(Iso(D)^0)=4, then D is holomorphically equivalent to the unit ball in C^2. Moreover, the authors prove the Thullen's classification on bounded Reinhaxdt domains in C^2 by the Lie group technique.展开更多
基金supported by the National Natural Science Foundation of China(Nos.11571288,11671330,11771357)
文摘Let D be a bounded positive (m, p)-circle domain in Cu. The authors prove that if dim(Iso(D)^0) = 2, then D is holomorphically equivalent to a Reinhardt domain; if dim(Iso(D)^0)=4, then D is holomorphically equivalent to the unit ball in C^2. Moreover, the authors prove the Thullen's classification on bounded Reinhaxdt domains in C^2 by the Lie group technique.
