On Exact Inequalities of Hardy–Littlewood–Polya Type

We show that certain Hardy-type inequalities hold in plump domains and domains with a Whitney cube #-condition. 1991 Mathematics Subject Classification. 46E35, 26D 10.

## Abstract Let {__I__~__k__~}~__k__∈ℕ~ be a sequence of well–distributed mutually disjoint intervals of ℝ\{0}. For __f__ ∈ __L__^__p__^(ℝ), 1 ≤ __p__ ≤ 2, define __S____f__ by (__S____f__)ˆ = χ$\hat f $. We prove that there exists a positive constant __C__ such that for all __f__ ∈ __L__^__p__^(ℝ

## Abstract Let (𝒳, __d__,__μ__) be a space of homogeneous type in the sense of Coifman and Weiss. Assuming that __μ__ satisfies certain estimates from below and there exists a suitable Calderón reproducing formula in __L__ ^2^(𝒳), the authors establish a Lusin‐area characterization for the atomic

## Abstract We discuss some reversed Hölder inequalities yielding for functions on R~+~ satisfying one or two conditions of quasi‐monotonicity. All cases of equality are pointed out. By using these results and some recent results by the present authors (see [3]), we prove some new reversed inequali

Some aspects of the interplay between approximation properties of analytic functions and the smoothness of its boundary values are discussed. One main result describes the equivalence of a special q-modulus of continuity and an intrinsic K-functional. Further, a generalization of a theorem due to G.