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On Weighted Inequalities with Geometric Mean Operator Generated by the Hardy-type Integral Transform


	Authors:	Maria Nassyrova, Lars-Erik Persson, Vladimir Stepanov,
	Keywords:	Integral inequalities, Weights, Geometric mean operator, Kernels, Riemann-Liouville operators.
	Date Received:	27/11/01
	Date Accepted:	29/04/02
	Subject Codes:	26D15,26D10.
	Editors:	Bohumir Opic,


	Abstract:	The generalized geometric mean operator $displaystyle G_{K}f(x)=exp dfrac{1}{K(x)}int_{0}^{x}k(x,y)log f(y)dy,$ with $K(x):=int_{0}^{x}k(x,y)dy$ is considered. A characterization of the weights and so that the inequality $displaystyle left( int_{0}^{infty }left( G_{K}f(x)ight) ^{q}uleft( xight) dxight) ^{1/q} qquadqquadqquad$ $displaystyle qquadqquadqquadleq Cleft( int_{0}^{infty }f(x)^{p}v(x)dxight) ^{1/p},quad fgeq 0,$ holds is given for all ;

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