Abstract
Let A p denote the Bergman space of functions f analytic in the unit disk D with ‖ f ‖ A p = { 1 π ∫ D | f ( z ) | p d A ( z ) } 1 p < + ∞ , where p > 0 , and d A is the Lebesgue area measure. In this paper we investigate some extremal problems on subordinate A p functions.
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