Multiple interpolation by Blaschke products

Autor: I. V. Videnskii
Rok vydání: 1986
Předmět:
Zdroj: Journal of Soviet Mathematics. 34:2139-2143
ISSN: 1573-8795
0090-4104
DOI: 10.1007/bf01741588
Popis: Basic result: let {zn} be a sequence of points of the unit disc and {kn} be a sequence of natural numbers, satisfying the conditions: Then for any bounded sequence of complex numbers there exists a sequence such that the function interpolates ω: where BΛ is the Blaschke product with zeros at the points λn(k)}, M is a constant, . if N=1 this theorem is proved by Earl (RZhMat, 1972, 1B 163). The idea of the proof, as in Earl, is that if the zeros {λn(k)} run through neighborhoods of the points zn, then the Blaschke products with these zeros interpolate sequences ω, filling some neighborhood of zero in the space Z∞. The theorem formulated is used to get interpolation theorems in classes narrower than H∞.
Databáze: OpenAIRE