Results 281 to 290 of about 355,073 (333)

Hermite–Hadamard type inequalities involving fractional integrals of exponentially convex functions

D. S. Malik, Zamrooda Jabeen
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Generalized Error Bounds for Mercer-Type Inequalities in Fractional Integrals with Applications

Arslan Munir, Hüseyin Budak, Artion Kashuri   +2 more
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On Sampling-Times-Independent Identification of Relaxation Time and Frequency Spectra Models of Viscoelastic Materials Using Stress Relaxation Experiment Data. [PDF]

Materials (Basel)
Stankiewicz A, Juściński S, Błażewicz-Woźniak M.   +2 more
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A Population Health and Lifestyle Survey of a Coastal City in England (Health Counts 2024): Protocol for a Cross-Sectional Study.

JMIR Res Protoc
Sherriff N, Gilchrist K, Mirandola M, Huber J, Aicken C, Galvin K, Sawyer A, Davidson S, Gray C, Vass CM, Knight L, Llewellyn C.   +11 more
europepmc   +1 more source

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Repeated Integral Inequalities

IMA Journal of Numerical Analysis, 1984
The purpose of this paper is to present the following linear generalization of Gronwall's inequality: Let the function x be continuous and non-negative on the interval [0,T]. If \[ x(t)\leq \Phi (t)+M\int^{t}_{0}\int^{t_ m}_{0}...\int^{t_ 1}_{0}[x(s)/(t_ 1-s)^{\alpha}]ds dt_ 1...dt_ m,\quad t\in [0,T], \] where \(\alpha 0\) is constant, and \(\Phi\) (t)
Dixon, Jennifer, McKee, Sean
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Symmetrization and Integral Inequalities

Mathematical Notes, 2023
This paper offers a comprehensive investigation into Steiner symmetrizations applied to anisotropic integral functionals within the multivariate calculus of variations, with a specific focus on functions belonging to the Sobolev class and characterized by compact support.
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Inequalities for a Multiple Integral

Acta Mathematica Hungarica, 1999
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
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Steffensen's Integral Inequality for the Sugeno Integral

International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems, 2014
In this paper we consider Steffensen's integral inequality for the Sugeno integral [Formula: see text] where f is a nonincreasing and convex function defined on [0, 1] with f(0) = 1, f(1) = 0 and g is a nonincreasing function defined on [0, 1] where 0 ≤ g(t) ≤ 1 for all t ∈ [a, b] with [Formula: see text]
Hong, Dug Hun, Moon, Eunho L., Kim, Jae Duck   +2 more
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