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Entropy results for Levinson-type inequalities via Green functions and Hermite interpolating polynomial functions and the Hermite interpolating polynomial for the class of n-convex functions. In seek
ESTIMATION OF DIFFERENT ENTROPIES VIA TAYLOR ONE POINT AND TAYLOR TWO POINTS INTERPOLATIONS USING JENSEN TYPE FUNCTIONALS are used to generalize the new inequalities for m-convex function.
Local Controllability in the Problem with Phase Space ChangeThis work researches the problem of controllability with phase space change. Nowadays theinterest
Hardy-Rellich inequalities in domains of the Euclidean space to the boundary of the domain. M.P. Owen proved that this inequality is valid in any convex domain with C2=9/16 (M
The topologies of local convergence
in measure on the algebra of measurable operators)$ of elementary operators is
$t_{\tau l}$-dense in $S(M, \tau)$. If $t_{\tau}$ is locally convex then so is $t
Implicit function theorem without a priori assumptions about normality given convex cone in a Banach space X, is considered. This equation is examined in a neighborhood of a
On the Analytic Part of Univalent Harmonic Mappings for | arg h′(z) | in the case when |z|≤1/2 and obtain the sharp radius of convexity for h. Our approach
Sherman's and related inequalities with applications in information theoryIn this paper we give extensions of Sherman's inequality considering the class of convex functions
On mappings related to the gradient of the conformal radiusWe establish a criterion for the gradient ∇R(D, z) of the conformal radius of a convex domain D
A geometric description of domains whose Hardy constant is equal to 1/4 geometric description of families of non-convex planar and spatial domains in which the following Hardy
Страница 36 из 6051
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