Compact Hankel operators on generalized Bergman spaces of the polydisc
Abstract
We show that for f a continuous function on the closed polydisc Dn with n≥ 2, the Hankel operator Hf is compact on the Bergman space of Dn if and only if there is a decomposition f=h+g, where h is in the ball algebra and g vanishes on the boundary of the polydisc.
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