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Функционально-дифференциальные уравнения с растяжением и симметрией\mapsto-x$ in higher-order derivatives. The study of solvability of the problem relies on a Garding-type inequality
Functional-Differential Equations with Dilation and Symmetry\mapsto-x $ in higher-order derivatives. The study of solvability of the problem relies on a Gårding-type inequality
Дифференциально-разностные уравнения с несоизмеримыми сдвигами аргументов of arguments are considered. Necessary and sufficient conditions for the fulfillment of Gårding-type
Spectral properties of functional-differential operators and a Gårding-type inequalitySpectral properties of functional-differential operators and a Gårding-type inequality are studied
The first boundary-value problem for strongly elliptic functional-differential equations with orthotropic contractionsGårding-type inequality
Functional Inequalities for the Mittag–Leffler FunctionsIn this paper, some Turán-type inequalities for Mittag–Leffler functions are considered. The method
On Jensen’s type inequalities via generalized majorization inequalities inequalities by using generalized majorization inequalities. We also present Grüss and Ostrowski-type
Steffensen–Grüss InequalityTwo inequalities for the Jensen difference under Steffensen’s conditions with Grüss type upper
A new look at classical inequalities involving Banach lattice norms inequalities in this more general frame. We already here contribute by discussing some results of this type
On a variant of Čebyšev’s inequality of the Mercer typeWe consider the discrete Jensen–Mercer inequality and Čebyšev’s inequality of the Mercer type. We
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