On generalized Toeplitz and little Hankel operators on Bergman spaces

Abstract

We find a concrete integral formula for the class of generalized Toeplitz operators Ta in Bergman spaces Ap, 1<p<∞, studied in an earlier work by the authors. The result is extended to little Hankel operators. We give an example of an L2-symbol a such that T|a| fails to be bounded in A2, although Ta : A2 A2 is seen to be bounded by using the generalized definition. We also confirm that the generalized definition coincides with the classical one whenever the latter makes sense.