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functions by using Abel–Gontscharoff interpolation. Cebyšev, Grüss, and Ostrowski-type new bounds are also

Three-weighted Hardy-type inequalities are investigated on a set of functions possessing monotony

compact set Ω ⊂ Rn, ξ ∈ [a, b] function g(τ, ξ) such that g(τ, a) · g(τ, b) < 0 we construct a function gε

} assuming that the Taylor coefficients of the function log(zf′(z)/f(z)) at zero are nonnegative. We also

integral operator containing an extended Mittag-Leffler function in the kernel. A number of corollaries

+ 1)-convex functions and exponentially convex functions.

of the Taylor coefficients of Bloch functions. We use one of these estimates to prove an inequality of an area

. Analogous for integral (Formula Presented) is also given. Represen-tation of a function f via the Fink

We establish a mean value property for the functions which is satisfied to Laplace–Bessel equation

to estimate the values of functionals in the coefficients of Bloch functions.

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