Author:
Żynda Tomasz Łukasz,Pasternak-Winiarski Zbigniew,Sadowski Jacek Józef,Krantz Steven George
Abstract
AbstractThe weighted Szegő kernel was investigated in a few papers (see Nehari in J d’Analyse Mathématique 2:126–149, 1952; Alenitsin in Zapiski Nauchnykh Seminarov LOMI 24:16–28, 1972; Uehara and Saitoh in Mathematica Japonica 29:887–891, 1984; Uehara in Mathematica Japonica 42:459–469, 1995). In all of these, however, only continuous weights were considered. The aim of this paper is to show that the Szegő kernel depends in a continuous way on a weight of integration in the case when the weights are not necessarily continuous. A topology on the set of admissible weights will be constructed and Pasternak’s theorem (see Pasternak-Winiarski in Studia Mathematica 128:1, 1998) on the dependence of the orthogonal projector on a deformation of an inner product will be used in the proof of the main theorem.
Publisher
Springer Science and Business Media LLC
Subject
Applied Mathematics,Computational Theory and Mathematics,Computational Mathematics
Reference11 articles.
1. Alenitsin, Y.E.: On weighted Szegő kernel functions. Zapiski Nauchnykh Seminarov LOMI 24, 16–28 (1972)
2. Carothers, N.L.: Real Analysis. Camrbidge University Press, Camrbidge (2000)
3. Krantz, S.G.: Function Theory of Several Complex Variables. American Mathematical Soc., Providence (2002)
4. Maj, R., Pasternak-Winiarski, Z.: On the analyticity of the Bergman transform. In: Proceedings of XXVIII Workshop on Geometric Methods in Physics, AIP Conference Proceedings 1191 (2009)
5. Nehari, Z.: On weighted kernels. J. d’Analyse Mathématique 2, 126–149 (1952)