Estimates for truncated area functionals on the Bloch space
Abstract
Recently, Kayumov \cite{K} obtained a sharp estimate for the -th truncated area functional for normalized functions in the Bloch space for and then, together with Wirths \cite{KW1}, extended the result for . We prove that for the functions with non-negative Taylor coefficients, the same sharp estimate is valid for all . For arbitrary functions, we obtain an estimate that is asymptotically of the same order but slightly larger (roughly by a factor of ). We also consider related weighted estimates for functionals involving the powers , , and show that the exponent represents the critical case for the expected sharp estimate.
Keywords
Cite
@article{arxiv.2208.10626,
title = {Estimates for truncated area functionals on the Bloch space},
author = {Iason Efraimidis and Alejandro Mas and Dragan Vukotić},
journal= {arXiv preprint arXiv:2208.10626},
year = {2023}
}
Comments
10 pages. Revised version. Sections have been reorganized, some discussions revised, and a new example included. The second author's address has changed since the first version