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Analogues to Landau’s Inequality for Nonvanishing Bounded Functions and for Bloch Functions with some famous inequalities for unimodular bounded functions proved by E. Landau and O. Szász, we derive
Lower bounds for one-way probabilistic communication complexity and their application to space complexity-error and bounded-error error probabilistic communication protocols for boolean functions. The lower bounds
Review of the Upper Bound Method for Application to Metal Forming ProcessesIn this paper, we review the upper bound method in plasticity with special reference to metal
New bounds for soft margin estimator via concavity of Gaussian weighting function these bounds for the soft margin estimator, we utilize the concavity of the Gaussian weighting function
New bounds for soft margin estimator via concavity of Gaussian weighting function these bounds for the soft margin estimator, we utilize the concavity of the Gaussian weighting function
Lower bounds for one-way probabilistic communication complexity and their application to space complexity-error and bounded-error error probabilistic communication protocols for boolean functions. The lower bounds
Sharp Bohr type inequality inequality for bounded analytic functions defined on the unit disk. We also prove two other sharp versions
MAJORIZATION INEQUALITIES VIA PEANO'S REPRESENTATION OF HERMITE'S POLYNOMIAL case. Cebysev functional is used to find the bounds for new generalized identities and to develop
Coefficient Inequalities for Bloch Functions of the Taylor coefficients of Bloch functions. We use one of these estimates to prove an inequality of an area
Fourier-Bessels transform of a generalized function Vanishing outside a bounded surfaceThe Fourier-Bessel transform of any generalized function f € S'ev vanishing outside a bounded
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