Integral means of derivatives of univalent functions in Hardy spaces

Abstract

We show that the norm in the Hardy space Hp satisfies equationabsteq \|f\|Hpp∫01Mqp(r,f')(1-r)p(1-1q)\,dr+|f(0)|p equation for all univalent functions provided that either q2 or 2p2+p<q<2. This asymptotic was previously known in the cases 0<p q<∞ and p1+p<q<p<2+2157 by results due to Pommerenke (1962), Baernstein, Girela and Pel\'aez (2004) and Gonz\'alez and Pel\'aez (2009). It is also shown that absteq is satisfied for all close-to-convex functions if 1 q<∞. A counterpart of absteq in the setting of weighted Bergman spaces is also briefly discussed.