Compactness of products of Hankel operators on convex Reinhardt domains in C2
Abstract
Let D be a piecewise smooth bounded convex Reinhardt domain in C2. Assume that the symbols f and g are continuous on the closure of D and harmonic on the disks in the boundary of D. We show that if the product of Hankel operators H*f Hg is compact on the Bergman space of D, then on any disk in the boundary of D, either f or g is holomorphic.
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