Results 61 to 70 of about 359 (228)
Youngs inequality for multivariate functions [PDF]
Journal of Nonlinear Sciences and Applications, 2016 The paper presents a generalization of Young's inequality to real functions of several variables. Moreover, the relevant facts about Young's inequality and its extension including improved proofs are provided in a review. The basic results are initiated by applying the integral method to a strictly increasing continuous function of one variable.
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American Journal of Agricultural Economics, EarlyView.Abstract Our general interest is in global trade loss from livestock pathogens, specifically exports. We adopt a causal inference approach that considers animal disease outbreaks over time as non‐staggered binary treatments with the potential for switching in (infection) and out of treatment (recovery) within the sample period. The outcome evolution of
Mohammad Maksudur Rahman +1 more
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HeliyonThe main motivation in this article is to prove new integral identities and related results. In this paper, we deal with E`-convex function, Hermite-Hadamard type inequalities, and Katugampola fractional integrals.
Muhammad Sadaqat Talha +5 more
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The Laguerre transform of a convolution product of vector-valued functions.
Математичні Студії, 2021 The Laguerre transform is applied to the convolution product of functions of a real argument (over the time axis) with values in Hilbert spaces.
A. O. Muzychuk
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American Journal of Agricultural Economics, EarlyView.Abstract Large‐scale land reforms constitute a substantial redistribution of wealth and reallocation of agricultural land, which is a major form of asset and production input in developing countries. While land redistribution (from the rich to the poor) remains a highly controversial issue, extensive evidence on its effect is limited.
Devashish Mitra +3 more
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Young's inequality for convolutions in Morrey-type spaces
, 2020 An analogue of the classical Young's inequality for convolutions of functions is proved in the case of the general global Morrey-type spaces. The form of this analogue is different from Young's inequality for convolutions in the case of the Lebesgue ...
Burenkov V.I., Tararykova T.V.
core
, 2023 Let $\mu$ be the Haar measure of a unimodular locally compact group $G$ and $m (G)$ as the infimum of the volumes of all open subgroups of $G$. The main result of this paper is that \begin{align*} \int_{G}^{} f \circ \left( \phi_1 * \phi_2 \right ...
Satomi, Takashi
core
A reverse of Young inequality [PDF]
Journal of Mathematical Inequalities, 2019 Summary: In this paper, we prove several multi-term refinements of reverse of Young inequality with Kantorovich constant for both real numbers and operators. Among other results, for all \(0\leqslant v\leqslant 1\) and \(N \in \mathbb{N}\), \((1-v)a+vb \leqslant (\sqrt{a}-\sqrt{b})^2-S_{N}(v;a,b)+K(\sqrt[2^N]{h},2)^{-\beta_{N}(v)}a^{1-v}b^{v}\) for all
Yang, Changsen, Ren, Yonghui
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Neighborhood social environments and mental health among youth and adults in public housing
American Journal of Community Psychology, EarlyView.Abstract Neighborhoods influence health in part through social processes. However, little is known about how multiple neighborhood social processes co‐occur, or about within (vs. between) neighborhood variation in social processes and health. This study asked how residents of a large public housing development describe their neighborhood and used ...
Jane Leer +3 more
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Properties and Applications of Symmetric Quantum Calculus
Fractal and FractionalSymmetric derivatives and integrals are extensively studied to overcome the limitations of classical derivatives and integral operators. In the current investigation, we explore the quantum symmetric derivatives on finite intervals.
Miguel Vivas-Cortez +4 more
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