Coefficient estimates for Hp spaces with 0<p<1
Abstract
Let C(k,p) denote the smallest real number such that the estimate |ak|≤ C(k,p)\|f\|Hp holds for every f(z)=Σn≥0an zn in the Hp space of the unit disc. We compute C(2,p) for 0<p<1 and C(3,2/3), and identify the functions attaining equality in the estimate.
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