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monotonicity conditions for functions. As applications, we calculate the norms of some integral operators

operators acting from one ideal space to another under matching convexity and concavity properties

-adjoint operators. The first class refers to a usual convexity, while the second one deals with the operator

integral operators is proved. Then, new fractional integral inequalities have been obtained for convex

The authors have derived necessary and sufficient conditions of discrete concavity of continuously

The paper is devoted to the study of weighted Hardy-type inequalities on the cone of quasi-concave

operators acting from one ideal space to another under matching convexity and concavity properties

obtain a sufficient condition for the positivity of an hermitian operator in $S(M, \tau)$ in terms

(f)zn that map D conformally onto a domain whose complement with respect to C is convex and that satisfy

(f)zn that map D conformally onto a domain whose complement with respect to C is convex and that satisfy

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