Geodesic
A Non-Normal Function Whose Derivative is of Hardy Class Hp , 0<p<1
Canadian mathematical bulletin, Tome 23 (1980) no. 4, pp. 499-500

Voir la notice de l'article provenant de la source Cambridge University Press

Let Hp(0<p≤∞) be the Hardy class of functions holomorphic in D={|z|<1}, and let f be a function holomorphic in D. It follows from the well known theorem [1, Theorem 3.11, p. 42] that if (I) , then (II) f can be extended continuously to the closed disk {|z|≤1}, and consequently, (III) f is normal in D in the sense of O. Lehto and K. I. Virtanen [2]. Since there is a considerable gap between (II) and (III), one would suspect that the condition (I) might be much stronger than necessary to obtain the conclusion (III). However, it is curious that the implication (I)⇒(III) is sharp as the following theorem shows. 
Yamashita, Shinji. A Non-Normal Function Whose Derivative is of Hardy Class Hp , 0<p<1. Canadian mathematical bulletin, Tome 23 (1980) no. 4, pp. 499-500. doi: 10.4153/CMB-1980-077-1
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[1] 1. Duren, Peter L., Theory of Hp spaces. Academic Press, New York and London, 1970. Google Scholar

[2] 2. Lehto, Olli and Virtanen, Kaarlo I., Boundary behaviour and normal meromorphic functions. Acta Math. 97 (1957), 47-65. Google Scholar

[3] 3. Protas, David, Blaschke products with derivative in Hp and Bp. Michigan Math. J. 20 (1973).393-396. Google Scholar

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