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Winner's Curse Free Robust Mendelian Randomization with Summary Data. [PDF]
J Am Stat AssocXie Z, Zhang W, Wang J, Wu C.
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Retrieving interpretability to support vector machine regression models in dynamic system identification. [PDF]
Front Artif IntellPena-Campos J +5 more
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Methodological Quality of Umbrella Reviews in Paediatric Dentistry: A Cross-Sectional Study. [PDF]
Int Dent JGopinath VK +7 more
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New A Priori FEM Error Estimates for Eigenvalues
SIAM Journal on Numerical Analysis, 2006We analyze the Ritz--Galerkin method for symmetric eigenvalue problems and prove a priori eigenvalue error estimates. For a simple eigenvalue, we prove an error estimate that depends mainly on the approximability of the corresponding eigenfunction and provide explicit values for all constants.
A. Knyazev, J. Osborn
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New anisotropic a priori error estimates
Numerische Mathematik, 2001We prove a priori anisotropic estimates for the $L^2$ and $H^1$ interpolation error on linear finite elements. The full information about the mapping from a reference element is employed to separate the contribution to the elemental error coming from different directions. This new
L. Formaggia, S. Perotto
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An Optimal A Priori Error Estimate for Nonlinear Multibody Contact Problems
SIAM Journal on Numerical Analysis, 2005Summary: Nonconforming domain decomposition methods provide a powerful tool for the numerical approximation of partial differential equations. For the discretization of a nonlinear multibody contact problem, we use linear mortar finite elements based on dual Lagrange multipliers. Under some regularity assumptions on the solution, an optimal convergence
S. Hüeber, B. Wohlmuth
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Temporal localized nonlinear model reduction with a priori error estimate
Applied Numerical Mathematics, 2017zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Saifon Chaturantabut
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A new a priori error estimate of nonconforming finite element methods
Science China Mathematics, 2014The authors consider second- and fourth-order elliptic equations along with Dirichlet boundary conditions in \(n=2\) and \(n=3\) dimensions. Assuming \(H^m\) regularity of the exact solutions and shape regular partitions into simplices or \(n\)-paralellotopes, they investigate the accuracy of nonconforming finite element methods, continuing work of ...
Jun-Jue Hu, R. Ma, Zhongci Shi
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