 Stein-Rosenberg theorem

The Stein-Rosenberg theorem is a result in the field of complex analysis, particularly in the study of function theory on Riemann surfaces and complex manifolds. It deals with the behavior of holomorphic functions on bounded domains and examines the conditions under which a holomorphic function can be extended. Although specific details about the theorem and its implications can be context-dependent, the theorem typically addresses aspects of analytic continuation and the relationships between different spaces of holomorphic functions.