Hilbert-Schmidt Hankel operators on the Segal-Bargmann space

Bauer, Wolfram

doi:10.1090/S0002-9939-04-07264-8

Hilbert-Schmidt Hankel operators on the Segal-Bargmann space
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Proc. Amer. Math. Soc. 132 (2004), 2989-2996 Request permission

Abstract:

This paper considers Hankel operators on the Segal-Bargmann space of holomorphic functions on $\mathbb {C}^n$ that are square integrable with respect to the Gaussian measure. It is shown that in the case of a bounded symbol $g \in L^{\infty }(\mathbb {C}^n)$ the Hankel operator $H_g$ is of the Hilbert-Schmidt class if and only if $H_{\bar {g}}$ is Hilbert-Schmidt. In the case where the symbol is square integrable with respect to the Lebesgue measure it is known that the Hilbert-Schmidt norms of the Hankel operators $H_g$ and $H_{\bar {g}}$ coincide. But, in general, if we deal with bounded symbols, only the inequality $\|H_g\|_{HS}\leq 2\|H_{\bar {g}}\|_{HS}$ can be proved. The results have a close connection with the well-known fact that for bounded symbols the compactness of $H_g$ implies the compactness of $H_{\bar {g}}$.

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