kw.\*:("Truncation error")
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Truncation error bounds for continued fractions K(an/1) with parabolic element regionsJONES, W. B; THRON, W. J; WAADELAND, R et al.SIAM journal on numerical analysis. 1983, Vol 20, Num 6, pp 1219-1230, issn 0036-1429Article
Truncation errors for infinite linear systemsMARINOV, C.IMA journal of numerical analysis. 1986, Vol 6, Num 1, pp 51-63, issn 0272-4979Article
On the approximation by truncated sampling series expansionsRIES, S. E; SPLETTSTOSSER, V. W.Signal processing. 1984, Vol 7, Num 2, pp 191-197, issn 0165-1684Article
Reflections on value regions, limit regions and truncation errors for continued fractionsRYE, E; WAADELAND, H.Numerische Mathematik. 1985, Vol 47, Num 2, pp 191-215, issn 0029-599XArticle
Truncation error bounds for limit-periodic continued fractions K(an/l) with lim an=0BALTUS, C; JONES, W. B.Numerische Mathematik. 1985, Vol 46, Num 4, pp 541-569, issn 0029-599XArticle
Resolution properties of the Fourier method for discontinuous wavesGOTTLIEB, D; CHI-WANG SHU.Computer methods in applied mechanics and engineering. 1994, Vol 116, Num 1-4, pp 27-37, issn 0045-7825Conference Paper
Further results on a series representation related to the sampling theoremCAMPBELL, L. L.Signal processing. 1985, Vol 9, Num 4, pp 225-231, issn 0165-1684Article
One-dimensional stretching functions for Cn patched grids, and associated truncation errors in finite-difference calculationsNITSCHE, L. C.Communications in numerical methods in engineering. 1996, Vol 12, Num 5, pp 303-316, issn 1069-8299Article
A DISCUSSION OF TIME TRANSFORMATIONS AND LOCAL TRUNCATION ERRORS.NACOZY P.1976; CELEST. MECH.; NETHERL.; DA. 1976; VOL. 13; NO 4; PP. 495-501; BIBL. 21 REF.Article
THE EFFECT OF TIME TRANSFORMATIONS ON LOCAL TRUNCATION ERRORS.FEAGIN T; MIKKILINENI RP.1976; CELEST. MECH.; NETHERL.; DA. 1976; VOL. 13; NO 4; PP. 491-493; BIBL. 2 REF.Article
HIGH-LATITUDE TRUNCATION ERRORS OF BOX-TYPE PRIMITIVE EQUATION MODELS.KALNAY RIVAS E.1976; MONTH. WEATHER REV.; U.S.A.; DA. 1976; VOL. 104; NO 8; PP. 1066-1069; BIBL. 5 REF.Article
Convolution and deconvolution with Gaussian kernelTA-MING FANG; SUN-SHENG SHEI; NAGEM, R. J et al.Il Nuovo cimento. B. 1994, Vol 109, Num 1, pp 83-92, issn 0369-3554Article
Analysis of some low-order finite element schemes for the Navier-Stockes equationsCULLEN, M. J. P.Journal of computational physics (Print). 1983, Vol 51, Num 2, pp 273-290, issn 0021-9991Article
On controlling the systematic errors in lattice quantum chromodynamics via pseudofermionsBILLOIRE, A; DE FORCRAND, P; MARINARI, E et al.Nuclear physics. B. 1986, Vol 270, Num 2, pp 333-345, issn 0550-3213Article
Numerical integration by means of adapted Euler summation formulasFREEDEN, W; FLECK, J.Numerische Mathematik. 1987, Vol 51, Num 1, pp 37-64, issn 0029-599XArticle
Approximation of the Friction Integral in Water Hammer EquationsCHYR PYNG LIOU; WYLIE, E. Benjamin.Journal of hydraulic engineering (New York, N.Y.). 2014, Vol 140, Num 5, issn 0733-9429, 06014008.1-06014008.5Article
Symbolic derivation of Runge-Kutta-Nyström order conditionsTSITOURAS, Ch; FAMELIS, I. Th.Journal of mathematical chemistry. 2009, Vol 46, Num 3, pp 896-912, issn 0259-9791, 17 p.Conference Paper
Numerical method satisfying the first two conservation laws for the Korteweg-de Vries equationCUI YANFEN; DE-KANG, Mao.Journal of computational physics (Print). 2007, Vol 227, Num 1, pp 376-399, issn 0021-9991, 24 p.Article
Interval boundary element method in the presence of uncertain boundary conditions, integration errors, and truncation errorsZALEWSKI, Bart F; MULLEN, Robert L; MUHANNA, Rafi L et al.Engineering analysis with boundary elements. 2009, Vol 33, Num 4, pp 508-513, issn 0955-7997, 6 p.Article
A sampling theorem for the fractional Fourier transform without band-limiting constraintsJUN SHI; WEI XIANG; XIAOPING LIU et al.Signal processing. 2014, Vol 98, pp 158-165, issn 0165-1684, 8 p.Article
An alternative discretization and solution procedure for the dual phase-lag equationMCDONOUGH, J. M; KUNADIAN, I; KUMAR, R. R et al.Journal of computational physics (Print). 2006, Vol 219, Num 1, pp 163-171, issn 0021-9991, 9 p.Article
Notes on accuracy of finite-volume discretization schemes on irregular gridsDISKIN, Boris; THOMAS, James L.Applied numerical mathematics. 2010, Vol 60, Num 3, pp 224-226, issn 0168-9274, 3 p.Article
Numerical experiments on the efficiency of local grid refinement based on truncation error estimatesSYRALCOS, Alexandros; EFTHIMIOU, Georgios; BARTZIS, John G et al.Journal of computational physics (Print). 2012, Vol 231, Num 20, pp 6725-6753, issn 0021-9991, 29 p.Article
The estimation of truncation error by τ-estimation revisitedFRAYSSE, F; DE VICENTE, J; VALERO, E et al.Journal of computational physics (Print). 2012, Vol 231, Num 9, pp 3457-3482, issn 0021-9991, 26 p.Article
A priori mesh quality estimation via direct relation between truncation error and mesh distortionKALLINDERIS, Y; KONTZIALIS, C.Journal of computational physics (Print). 2009, Vol 228, Num 3, pp 881-902, issn 0021-9991, 22 p.Article
