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Theoretical Dynamics Modeling of Pitch Motion and Obstacle-Crossing Capability Analysis for Articulated Tracked Vehicles Based on Myriapod Locomotion Mechanism. [PDF]
Biomimetics (Basel)Li N, Liu X, Chen H, Zhang Y, Zhang S.
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Challenges in the mathematical modeling of the spatial diffusion of SARS-CoV-2 in Chile. [PDF]
Math Biosci EngGonzález-Parra G +4 more
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Elastic-Plastic Analysis of Asperity Based on Wave Function. [PDF]
Materials (Basel)Xu Z +6 more
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Calcolo, 1993
Let \(f \in C^ 1[- 1,1]\) with the usual norm \(\max (\| f \|_ \infty, \| f' \|_ \infty)\) and let \(H_{2n} (f)\) be the Hermite interpolation polynomial of degree at most \(2n - 1\) interpolating \(f\) and \(f'\) at the zeros \(x_ k\), \(k = 1, \dots, n\) of the Jacobi polynomial with weight \((1 - x)^ \alpha (1 + x)^ \beta\), \(\alpha, \beta > - 1\),
DELLA VECCHIA, Biancamaria +1 more
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Let \(f \in C^ 1[- 1,1]\) with the usual norm \(\max (\| f \|_ \infty, \| f' \|_ \infty)\) and let \(H_{2n} (f)\) be the Hermite interpolation polynomial of degree at most \(2n - 1\) interpolating \(f\) and \(f'\) at the zeros \(x_ k\), \(k = 1, \dots, n\) of the Jacobi polynomial with weight \((1 - x)^ \alpha (1 + x)^ \beta\), \(\alpha, \beta > - 1\),
DELLA VECCHIA, Biancamaria +1 more
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Hermite-Fejéa and Hermite Interpolation
1992The authors consider two procedures of Hermite and Hermite-Fejer interpolation based on the zeros of Jacobi polynomials plus additional nodes and prove that such procedures can always well approximate a function and its derivatives simultaneously.
CRISCUOLO, GIULIANA +2 more
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Geometric Hermite interpolation
Computer Aided Geometric Design, 1995zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Höllig, K., Koch, J.
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Computer Aided Geometric Design, 2001
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Gfrerrer, A., Röschel, O.
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Gfrerrer, A., Röschel, O.
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Hermite–Birkhoff interpolation by Hermite–Birkhoff splines
Proceedings of the Royal Society of Edinburgh: Section A Mathematics, 1981SynopsisWe consider interpolation by piecewise polynomials, where the interpolation conditions are on certain derivatives of the function at certain points, specified by a finite incidence matrix E. Similarly the allowable discontinuities of the piecewise polynomials are specified by a finite incidence matrix F. We first find necessary conditions on (E,
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