On exact analogues of the Hardy inequality for differences in the case of related weights

The paper deals with Hardy-type inequalities when the right-hand side contains the weighted norm of difference, modulus of continuity or the best approximation operator of a given function. The authors give necessary and sufficient conditions for the case of related weights. The following result is typical. par Theorem 1. Let 1le p 0. Then the inequality multline int_0^a |f|^p v le Cleft( v(a)int_0^a |f|^p + int_0^aint_0^a |f(x) - f(y)|^p w(|x-y|)dxdyright) endmultline holds if and only if int_0^t v le Ctv(t).

Authors
Burenkov V.I. , Golʹdman M.L.
Editors
Stepanov Vladimir D.
Number of issue
2
Language
Russian
Pages
155-157
Status
Published
Number
366
Volume
366
Year
1999
Date of creation
19.05.2021
Date of change
19.05.2021
Short link
https://repository.rudn.ru/en/records/article/record/73773/
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