Bergman-Toeplitz operators on weakly pseudoconvex domains
Abstract
We prove that for certain classes of pseudoconvex domains of finite type, the Bergman-Toeplitz operator T with symbol =K-α maps from Lp to Lq continuously with 1< p q<∞ if and only if α1p-1q, where K is the Bergman kernel on diagonal. This work generalises the results on strongly pseudoconvex domains by Cuckovi\'c and McNeal, and Abeta, Raissy and Saracco.
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