MATHEMATICA BOHEMICA, Vol. 133, No. 4, pp. 351-366, 2008

On some problems connected with diagonal map
in some spaces of analytic functions

Romi Shamoyan

Romi Shamoyan, Bryansk Pedagogical University, Bryansk, Russia, e-mail: rshamoyan@yahoo.com

Abstract: For any holomorphic function $f$ on the unit polydisk $\DD^n$ we consider its restriction to the diagonal, i.e., the function in the unit disc $\DD\subset\CC$ defined by $\Diag f(z)=f(z,\ldots,z)$, and prove that the diagonal map $\Diag$ maps the space $Q_{p,q,s}(\DD^n)$ of the polydisk onto the space $\widehat Q^q_{p,s,n}(\DD)$ of the unit disk.

Keywords: diagonal map, holomorphic function, Bergman space, polydisk

Classification (MSC 2000): 47B35, 30H05


Full text available as PDF (smallest), as compressed PostScript (.ps.gz) or as raw PostScript (.ps).

Access to the full text of journal articles on this site is restricted to the subscribers of Myris Trade. To activate your access, please contact Myris Trade at myris@myris.cz.


[Previous Article] [Next Article] [Contents of This Number] [Contents of Mathematica Bohemica]
[Full text of the older issues of Mathematica Bohemica at DML-CZ]