Some integral operators acting on H∞
Abstract
Let f and g be analytic on the unit disc D. The integral operator Tg is defined by Tg f(z) = ∫0z f(t)g'(t)\,dt, z ∈ D. The problem considered is characterizing those symbols g for which Tg acting on H∞, the space of bounded analytic functions on D, is bounded or compact. When the symbol is univalent, these become questions in univalent function theory. The corresponding problems for the companion operator, Sg f(z)= ∫0z f'(t)g(t)\, dt, acting on H∞ are also studied.
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