Results 11 to 20 of about 736 (209)
Mathematical Modelling and Analysis, 2016 We consider integral error representation related to the Hermite interpolating polynomial and derive some new estimations of the remainder in quadrature formulae of Hermite type, using Holder’s inequality and some inequalities for the Čebyšev functional.
Gorana Aras-Gazic +2 more
doaj +3 more sources
Extended Jensen’s functional for diamond integral via Green’s function and Hermite polynomial
Journal of Inequalities and Applications, 2022 In this paper, with the help of Green’s function and Hermite interpolating polynomial, an extension of Jensen’s functional for n-convex functions is deduced from Jensen’s inequality involving diamond integrals.
Fazilat Bibi +3 more
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Generalizations of Ostrowski type inequalities via Hermite polynomials
Journal of Inequalities and Applications, 2020 We present new generalizations of the weighted Montgomery identity constructed by using the Hermite interpolating polynomial. The obtained identities are used to establish new generalizations of weighted Ostrowski type inequalities for differentiable ...
Ljiljanka Kvesić +2 more
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LamelODF: a MATLAB‐based toolbox for orientation distribution analysis and mapping of lamellar minerals for laboratory and synchrotron X‐ray diffractometers [PDF]
Journal of Applied Crystallography, Volume 59, Issue 2, Page 648-661, April 2026.LamelODF is a MATLAB‐based toolbox aimed at simplifying the automated extraction of orientation distribution functions from 2D X‐ray diffraction data of lamellar minerals in transmission mode. It accommodates both laboratory and synchrotron data formats, providing an integrated pipeline from raw data to spatially resolved textural maps, enabling robust
Baptiste Dazas +5 more
wiley +2 more sources
A Preprocessing Pipeline for Pupillometry Signal from Multimodal iMotion Data [PDF]
SensorsPupillometry is commonly used to evaluate cognitive effort, attention, and facial expression response, offering valuable insights into human performance.
Jingxiang Ong +6 more
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Atomic Electronic Structure Calculations with Hermite Interpolating Polynomials [PDF]
The Journal of Physical Chemistry A, 2023 26 pages, 9 figures.
Lehtola S.
openaire +5 more sources
On the Leibniz formula for divided differences
Journal of Numerical Analysis and Approximation Theory, 2006 We give an identity for the Hermite-Lagrange interpolating polynomial and a short proof of Leibniz-type formula for divided differences in case of coalescing knots.
Mircea Ivan
doaj +4 more sources
New entropic bounds on time scales via Hermite interpolating polynomial
Journal of Inequalities and Applications, 2021 Hermite’s interpolation is utilized to establish a new generalization of an inequality for higher order convex functions containing Csiszár divergence on time scales. New entropic bounds in q-calculus and h-discrete calculus are also deduced.
Iqrar Ansari +4 more
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An Efficient Bi-Parametric With-Memory Iterative Method for Solving Nonlinear Equations
AppliedMath, 2023 New three-step with-memory iterative methods for solving nonlinear equations are presented. We have enhanced the convergence order of an existing eighth-order memory-less iterative method by transforming it into a with-memory method.
Ekta Sharma +3 more
doaj +1 more source
Mathematics, 2023 The methods that use memory using accelerating parameters for computing multiple roots are almost non-existent in the literature. Furthermore, the only paper available in this direction showed an increase in the order of convergence of 0.5 from the ...
G Thangkhenpau +3 more
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