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The problem is considered of constructing optimal (i.e. minimal) generalized Banach function space

arerepresented by integrals of symmetric functions fn defined on the Cartesian powers Ωⁿ of a set Ω with a

We state new general linear identities and inequalities involving n-convex functions using Hermite

The problem is considered of constructing optimal (i.e. minimal) generalized Banach function space

with some famous inequalities for unimodular bounded functions proved by E. Landau and O. Szász, we derive

-hypergeometric functions. The results are also closely connected with Turán type inequalities. In order to obtain main

In this paper, the refinements of integral inequalities for all those types of convex functions

We generalize cyclic refinements of Jensen’s inequality from a convex function to a higher

The Fourier-Bessel transform of any generalized function f € S'ev vanishing outside a bounded

term. Using the Bessel functions we prove one dimensional inequality and their multidimensional analogs

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