A asymptotic analog of the F. and M. Riesz radial uniqueness theorem.
A asymptotic analog of the F. and M. Riesz radial uniqueness theorem.
The Riesz theorem is not true for sets of measure zero since it is known that given any set PC C of measure zero (in particular, P may be of second category) there exists a nonconstant function f(z), holomorphic and bounded in D, with radial limit zero at each point …