Аннотация:
In the talk we present a solution of Chui’s problem on the simplest fractions
(i.e., sums of Cauchy kernels with unit coefficients) in weighted (Hilbert)
Bergman spaces. Namely, for a wide class of weights, it will be shown that
for every $N$, the simplest fractions with $N$ poles on the unit circle have
minimal norm if and only if the poles are equidistributed on the circle. We
present sharp asymptotics of these norms. Finally, we describe the closure
of the simplest fractions in weighted Bergman spaces.
The talk is based on a joint work with E. Abakumov (Univ.
Gustave Eiffel) and A. Borichev (Aix–Marseille Univ.).
Обратная связь: