The Skoda–El Mir theorem is a result in complex analysis, specifically in the theory of several complex variables and the study of holomorphic functions. It pertains to the properties of holomorphic functions defined on complex manifolds, particularly focusing on the behavior of such functions near their zero sets. In essence, the theorem addresses the relationships between the zero sets of holomorphic functions and their implications for the analyticity and continuity of these functions.
Articles by others on the same topic
There are currently no matching articles.