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Integration Operator Acting on Hardy and Weighted Bergman Spaces

Published online by Cambridge University Press:  17 April 2009

Jouni Rättyä
Affiliation:
University of Joensuu, Department of Mathematics, P.O. Box 111, 80101 Joensuu, Finland, e-mail: jouni.rattya@joensuu.fi
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Questions related to the operator Jg(f)(z):= ∫xof (ζ)g′(ζ) , induced by an analytic function g in the unit disc, are studied. It is shown that a function G is the derivative of a function in the Hardy space Hp if and only if it is of the form G = Fψ′ where FHq, ψ ∈ H3 and 1/s = 1/p − 1/q. Moreover, a complete characterisation of when Jg is bounded or compact from one weighted Bergman space into another is established, and an asymptotic formula for the essential norm of Jg, the distance from compact operators in the operator norm, is given. As an immediate consequence it is obtained that if p < 2 + α and α > −1, then any primitive of belongs to where q = ((2 + α) p)/(2 + α − p). For α = −1 this is a sharp result by Hardy and Littlewood on primitives of functions in Hardy space , 0 < p < 1.

Type
Research Article
Copyright
Copyright © Australian Mathematical Society 2007

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