Results 171 to 180 of about 544,469 (212)

A Priori Truncation Error Estimates for Stieltjes Fractions

1981
Stieltjes fractions are here studied in the form K(a n z/1), a n > 0, n ≥ 1. They provide expansions for many useful functions and have integral representations $$ \int\limits_0^\infty {\frac{{zd\psi (t)}}{{1 + zt}}} $$ .
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A Priori Error Estimates for State-Constrained Semilinear Parabolic Optimal Control Problems

Journal of Optimization Theory and Applications, 2018
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Francesco Ludovici, Ira Neitzel, Winnifried Wollner   +2 more
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A priori estimates of the approximation errors of a multidimensionalg-fraction

Journal of Mathematical Sciences, 1999
Applying a multidimensional π-fraction, we establish estimates of the rate of convergence of a multidimensional g-fraction in certain bounded domains.
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A priori error estimates for a coseismic slip optimal control problem

Applied Numerical Mathematics
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Jorge Aguayo, Rodolfo Araya
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A Priori Error Estimates for the Method of Inclusion-Exclusion with Applications

SIAM Journal on Applied Mathematics, 1984
Summary: The method of inclusion-exclusion can be used to obtain successive upper and lower bounds on the probability of the occurrence of complex events. Usually only the first upper and the first lower bound are considered. But as they can be crude, further bounds must not be excluded from methodical studies and practical computations.
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Hp-error Analysis of Mixed-order Hybrid High-order Methods for Elliptic Problems on Simplicial Meshes

arXiv.org
We present both $hp$-a priori and $hp$-a posteriori error analysis of a mixed-order hybrid high-order (HHO) method to approximate second-order elliptic problems on simplicial meshes.
Zhaonan Dong, A. Ern
semanticscholar   +1 more source

A hp—Discontinuous Galerkin Method for the Time‐Dependent Maxwell’s Equation: a priori Error Estimate

, 2009
C. Daveau, A. Zaghdani
semanticscholar   +2 more sources

An a priori error estimate for finite element discretizations in nonlinear elasticity for polyconvex materials under small loads

Numerische Mathematik, 2004
C. Carstensen, G. Dolzmann
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A priori error estimates for the Arbitrary Lagrangian Eulerian formulation with finite elements

Journal of Numerical Mathematics, 2001
The approximation by finite elements of a time-dependent advection-diffusion problem in a moving two-dimensional domain is considered. The author assumes that the motion of the boundary of the domain is given. This problem is discretized by linear finite elements in space and a modification of the implicit Euler scheme, based on the mid-point rule, in ...
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A priori error estimate for a well-balanced scheme designed for inhomogeneous scalar conservation laws†

, 1998
L. Gosse
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