Optimal relations between Lp-norms for the Hardy operator and its dual

Abstract

We obtain sharp two-sided inequalities between Lp-norms (1<p<∞) of functions Hf and H*f, where H is the Hardy operator, H* is its dual, and f is a nonnegative measurable function on (0,∞). In an equivalent form, it gives sharp constants in the two-sided relations between Lp-norms of functions H- and , where is a nonnegative nonincreasing function on (0,+∞) with (+∞)=0. In particular, it provides an alternative proof of a result obtained by N. Kruglyak and E. Setterqvist (2008) for p=2k (k∈ ) and by S. Boza and J. Soria (2011) for all p 2, and gives a sharp version of this result for 1<p<2.