Reduction theorems for weighted integral inequalities on the cone of monotone functions

This paper surveys results related to the reduction of integral inequalities involving positive operators in weighted Lebesgue spaces on the real semi-axis and valid on the cone of monotone functions, to certain more easily manageable inequalities valid on the cone of non-negative functions. The case of monotone operators is new. As an application, a complete characterization for all possible integrability parameters is obtained for a number of Volterra operators. © 2013 Russian Academy of Sciences (DoM).

Authors

Gogatishvili A.¹ , Stepanov V.D. ²

Journal

Russian Mathematical Surveys

Number of issue

Language

English

Pages

597-664

Status

Published

Link

External link

DOI

10.1070/RM2013v068n04ABEH004849

Volume

Year

2013

Organizations

¹ Academy of Sciences, Institute of Mathematics, Czech Republic
² Peoples Friendship University of Russia, Moscow, Russian Federation

Keywords

Bounded operators; Cone of monotone functions; Duality principle; Reduction theorem; Weighted integral inequality; Weighted lebesgue space

Date of creation

19.10.2018

Date of change

19.10.2018

Short link

https://repository.rudn.ru/en/records/article/record/1938/

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Reduction theorems for weighted integral inequalities on the cone of monotone functions

Other records

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EUROPEAN GUIDELINES ON HYPERTENSION IN 2013: UNCHANGING, NEW, UNSOLVED