Results 31 to 40 of about 251 (126)

New convex integral inequalities involving multiple functions

Latin American Journal of Mathematics
This article explores a modern counterpart to the classical Jensen integral inequality for integrals, which provides an upper bound for convex functions evaluated at an integral. We extend this result to more general settings involving sums and products of integrals of multiple functions.
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Multiple-term improvements of Jensen's inequality for (p,h)-convex and (p,h)-log convex functions

Journal of Mathematical Inequalities
Summary: In this paper, we present several new multiple-term improvements of Jensen's inequality for \((p, h)\)-convex and \((p, h)\)-log convex functions. As applications of our results, we present new bounds by employing means and Hölder type inequalities for the symmetric norms for \(\tau\)-measurable operators. We make links between ourfindings and
Huy, Duong Quoc, Gourty, Abdelmajid, Ighachane, Mohamed Amine, Boumazgour, Mohamed   +3 more
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Control problems driven by approximately pseudo-convex multiple integral functionals

Mathematical Control and Related Fields
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Marghescu, Cristina-Florentina, Treanță, Savin   +1 more
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Milne and Hermite-Hadamard's type inequalities for strongly multiplicative convex function via multiplicative calculus

AIMS Mathematics
<p>In this paper, we take into account the notion of strongly multiplicative convex function and derive integral inequalities of Hermite-Hadamard ($ H.H $) type for such a function in the frame of multiplicative calculus. We also develop integral inequalities of $ H.H $ type for product and quotient of strongly multiplicative convex and strongly ...
Muhammad Umar, Saad Ihsan Butt, Youngsoo Seol   +2 more
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Plastic Evolution Characterization for 304 Stainless Steel by CQN_Chen Model under the Proportional Loading. [PDF]

Materials (Basel), 2023
Gao X, Wang S, Xu Z, Zhou J, Wan X, Rayhan HMA, Lou Y.   +6 more
europepmc   +1 more source

Wright type multiplicatively convex functions [PDF]

Mathematical Inequalities & Applications, 2015
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On Jensen's multiplicative inequality for positive convex functions of selfadjoint operators in Hilbert spaces

, 2020
Summary: We obtain some multiplicative refinements and reverses of Jensen's inequality for positive convex/concave functions of selfadjoint operators in Hilbert spaces. Natural applications for power and exponential functions are provided.
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Building transformers from neurons and astrocytes. [PDF]

Proc Natl Acad Sci U S A, 2023
Kozachkov L, Kastanenka KV, Krotov D.
europepmc   +1 more source

Rapid discovery of stable materials by coordinate-free coarse graining. [PDF]

Sci Adv, 2022
Goodall REA, Parackal AS, Faber FA, Armiento R, Lee AA.   +4 more
europepmc   +1 more source

Robust Transceiver Design for IRS-Assisted Cascaded MIMO Communication Systems. [PDF]

Sensors (Basel), 2022
Esmaeili H, Kariminezhad A, Sezgin A.
europepmc   +1 more source