Mustafayev, RzaUnver, Tugce2020-06-252020-06-252015Mustafayev, Rza & Unver, Tugce. (2014). Reverse Hardy-type inequalities for supremal operators with measures. Mathematical Inequalities & Applications. 18(4), 1295-1311.1331-4343https://doi.org/10.7153/mia-18-101https://hdl.handle.net/20.500.12587/6032Unver Yildiz, Tugce/0000-0003-0414-8400; Yildiz, Tugce Unver/0000-0003-0414-8400; Mustafayev, Rza/0000-0002-2806-9646In this paper we characterize the validity of the inequalities parallel to g parallel to(p,(a, b),lambda) <= c parallel to u(x)parallel to g parallel to(infinity,(x,b),mu) parallel to(q,(a,b),nu) and parallel to g parallel to(p,(a, b),lambda) <= c parallel to u(x)parallel to g parallel to(infinity,(a,x),mu) parallel to(q,(a,b),nu) for all non-negative Borel measurable functions g on the interval (a, b) subset of R, where 0 < p <= +infinity, 0 < q <= +infinity, lambda, mu and nu are non-negative Borel measures on (a, b), and u is a weight function on (a, b)eninfo:eu-repo/semantics/openAccessSupremal operatorreverse Hardy-type inequalityBorel measuresweight functionsdiscretizationArticle1841295131110.7153/mia-18-1012-s2.0-84946100604Q1WOS:000369434500009Q3