Integral analog of one generalization of the Hardy inequality and its applications

Under certain conditions on continuous functions $μ, λ, a$, and $f$, we prove the inequality $$\int\limits_0^y {\mu (x)\lambda (x)f\left( {\frac{{\int_0^x {\lambda (t)a(t)dt} }}{{\int_0^x {\lambda (t)dt} }}} \right)dx \leqslant K\int\limits_0^y {\mu (x)\lambda (x)f(a(x))} dx,} y \leqslant \infty ,$$...

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Bibliographic Details
Date:	2006
Main Authors:	Mulyava, O. M., Мулява, О. М.
Format:	Article
Language:	Ukrainian English
Published:	Institute of Mathematics, NAS of Ukraine 2006
Online Access:	https://umj.imath.kiev.ua/index.php/umj/article/view/3528
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Journal Title:	Ukrains’kyi Matematychnyi Zhurnal
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Integral analog of one generalization of the Hardy inequality and its applications

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