Proceedings of the American Mathematical Society

The canonical solution operator to $\overline{\partial}$ restricted to Bergman spaces

Author(s): Friedrich Haslinger
Journal: Proc. Amer. Math. Soc. 129 (2001), 3321-3329.
MSC (2000): Primary 32W05; Secondary 32A36
Posted: April 2, 2001
Retrieve article in: PDF DVI PostScript
This article is available free of charge

We first show that the canonical solution operator to $\overline{\partial}$ restricted to

-forms with holomorphic coefficients can be expressed by an integral operator using the Bergman kernel. This result is used to prove that in the case of the unit disc in $\mathbb C$ the canonical solution operator to $\overline{\partial}$ restricted to

-forms with holomorphic coefficients is a Hilbert-Schmidt operator. In the sequel we give a direct proof of the last statement using orthonormal bases and show that in the case of the polydisc and the unit ball in $\mathbb C^n, n>1,$ the corresponding operator fails to be a Hilbert-Schmidt operator. We also indicate a connection with the theory of Hankel operators.

[A]: S. Axler, The Bergman space, the Bloch space, and commutators of multiplication operators, Duke Math. J. 53 (1986), 315-332. MR 87m:47064
[AFP]: J. Arazy, S. Fisher and J. Peetre, Hankel operators on weighted Bergman spaces, Amer. J. of Math. 110 (1988), 989-1054. MR 90a:47067
[B]: F.F. Bonsall, Hankel operators on the Bergman space for the disc, J. London Math. Soc. (2) 33 (1986), 355-364. MR 88e:47045
[C]: D. Catlin, Subelliptic estimates for the $\overline{\partial} -$ Neumann problem on pseudoconvex domains, Ann. of Math. 126 (1987), 131-191. MR 88i:32025
[CD]: D. Catlin and J. D'Angelo, Positivity conditions for bihomogeneous polynomials, Math. Res. Lett. 4 (1997), 555-567. MR 98e:32023
[FS1]: S. Fu and E.J. Straube, Compactness of the $\overline{\partial}-$ Neumann problem on convex domains, J. of Functional Analysis 159 (1998), 629-641. MR 99h:32019
[FS2]: S. Fu and E.J. Straube, Compactness in the $\overline{\partial} -$ Neumann problem, preprint, 1999.
[J]: S. Janson, Hankel operators between weighted Bergman spaces, Ark. Mat. 26 (1988), 205-219. MR 91j:47027
[K1]: St. Krantz, Function theory of several complex variables, Wadsworth & Brooks/Cole, 1992 (2nd edition). MR 93c:32001
[K2]: St. Krantz, Compactness of the $\overline{\partial} -$ Neumann operator, Proc. Amer. Math. Soc. 103(1988), 1136-1138. MR 89f:32032
[L]: Ewa Ligocka, ``The regularity of the weighted Bergman projections'', in Seminar on deformations, Proceedings, Lodz-Warsaw, 1982/84, Lecture Notes in Math. 1165, Springer-Verlag, Berlin, 1985, 197-203. MR 87d:32044
[MV]: R. Meise und D. Vogt, Einführung in die Funktionalanalysis, Vieweg Studium 62, Vieweg-Verlag, 1992. MR 94f:46003
[R]: R. Rochberg, Trace ideal criteria for Hankel operators and commutators, Indiana Univ. Math. J. 31 (1982), 913-925. MR 84d:47036
[SSU]: N. Salinas, A. Sheu and H. Upmeier, Toeplitz operators on pseudoconvex domains and foliation $C^{\ast}$ -algebras, Ann. of Math. 130 (1989), 531-565. MR 91e:47026
[W]: R. Wallsten, Hankel operators between weighted Bergman spaces in the ball, Ark. Mat. 28 (1990), 183-192. MR 91i:47041
[Z]: K.H. Zhu, Hilbert-Schmidt Hankel operators on the Bergman space, Proc. Amer. Math. Soc. 109 (1990), 721-730. MR 90k:47060

Retrieve articles in Proceedings of the American Mathematical Society with MSC (2000): 32W05, 32A36

Friedrich Haslinger
Affiliation: Institut für Mathematik, Universität Wien, Strudlhofgasse 4, A-1090 Wien, Austria
Email: friedrich.haslinger@univie.ac.at

DOI: 10.1090/S0002-9939-01-05953-6
PII: S 0002-9939(01)05953-6
Keywords: $\overline\partial$-equation, Bergman kernel
Received by editor(s): March 20, 2000
Posted: April 2, 2001
Communicated by: David S. Tartakoff
Copyright of article: Copyright 2001, American Mathematical Society

			Journals Home Search Author Info Subscribe Tech Support Help
ISSN 1088-6826 (e) ISSN 0002-9939 (p)

Previous issue \| Table of contents \| Next issue Articles in press \| Recently posted articles \| Most recent issue \| All issues Previous Article \| Next Article


	Comments: webmaster@ams.org © Copyright 2008, American Mathematical Society Privacy Statement		Search the AMS