Compactness of Toeplitz operators with continuous symbols on pseudoconvex domains in Cn
Abstract
Let be a bounded pseudoconvex domain in Cn with Lipschitz boundary and φ be a continuous function on . We show that the Toeplitz operator Tφ with symbol φ is compact on the weighted Bergman space if and only if φ vanishes on the boundary of . We also show that compactness of the Toeplitz operator Tp,qφ on ∂-closed (p,q)-forms for 0≤ p≤ n and q≥ 1 is equivalent to φ=0 on .
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