A generalization of Toeplitz operators on the Bergman space
Abstract
If μ is a finite measure on the unit disc and k 0 is an integer, we study a generalization derived from Englis's work, Tμ(k), of the traditional Toeplitz operators on the Bergman space A2, which are the case k=0. Among other things, we prove that when μ 0, these operators are bounded if and only if μ is a Carleson measure, and we obtain some estimates for their norms.
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