Isometries of the product of composition operators on weighted Bergman space
Abstract
In this paper the necessary and sufficient conditions for the product of composition operators to be isometry are obtained on weighted Bergman space. With the help of a counter example we also proved that unlike on H2(D) and Aα2(D), the composition operator on S2(D) induced by an analytic self map on D with fixed origin need not be of norm one. We have generalized the Schwartz's well known result on Aα2(D) which characterizes the almost multiplicative operator on H2(D).
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