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Weighted norm inequalities for positive operators restricted on the cone of λ-quasiconcave functions

Published online by Cambridge University Press:  23 January 2019

Amiran Gogatishvili
Affiliation:
Institute of Mathematics of the Czech Academy of Sciences, Žitna 25, 11567 Praha 1, Czech Republic ([email protected])
Júlio S. Neves
Affiliation:
CMUC, Department of Mathematics, University of Coimbra, Apartado 3008, EC Santa Cruz, 3001–454 Coimbra, Portugal ([email protected])

Abstract

Let ρ be a monotone quasinorm defined on ${\rm {\frak M}}^ + $, the set of all non-negative measurable functions on [0, ∞). Let T be a monotone quasilinear operator on ${\rm {\frak M}}^ + $. We show that the following inequality restricted on the cone of λ-quasiconcave functions

$$\rho (Tf) \les C_1\left( {\int_0^\infty {f^p} v} \right)^{1/p},$$
where $1\les p\les \infty $ and v is a weighted function, is equivalent to slightly different inequalities considered for all non-negative measurable functions. The case 0 < p < 1 is also studied for quasinorms and operators with additional properties. These results in turn enable us to establish necessary and sufficient conditions on the weights (u, v, w) for which the three weighted Hardy-type inequality
$$\left( {\int_0^\infty {{\left( {\int_0^x f u} \right)}^q} w(x){\rm d}x} \right)^{1/q} \les C_1\left( {\int_0^\infty {f^p} v} \right)^{1/p},$$
holds for all λ-quasiconcave functions and all 0 < p, q ⩽ ∞.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 2019

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