2006
DOI: 10.1016/j.jcp.2006.02.014
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On the order of accuracy for difference approximations of initial-boundary value problems

Abstract: Finite difference approximations of the second derivative in space appearing in, parabolic, incompletely parabolic systems of, and second order hyperbolic, partial differential equations are considered. If the solution is pointwise bounded, we prove that finite difference approximations of those classes of equations can be closed with two orders less accuracy at the boundary without reducing the global order of accuracy.This result is generalised to initial-boundary value problems with an mth order principal p… Show more

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Cited by 159 publications
(202 citation statements)
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“…As time-integrator, the classical 4th-order Runge-Kutta method with 5000 grid points was used. The results shown in Table 1 confirm that the scheme is accurate for the 2nd-, 3rd-, 4th-and 5th-order SBP-SAT schemes [23].…”
Section: Rate Of Convergence For the Deterministic Casesupporting
confidence: 63%
See 1 more Smart Citation
“…As time-integrator, the classical 4th-order Runge-Kutta method with 5000 grid points was used. The results shown in Table 1 confirm that the scheme is accurate for the 2nd-, 3rd-, 4th-and 5th-order SBP-SAT schemes [23].…”
Section: Rate Of Convergence For the Deterministic Casesupporting
confidence: 63%
“…We discretize using high-order finite difference methods on summation-by-parts form with weakly imposed boundary conditions, and prove strong stability [23,24]. The statistics of the solution such as the mean, variance and confidence intervals are computed non-intrusively using quadrature rules for the given stochastic distributions [10,12].…”
Section: Introductionmentioning
confidence: 99%
“…We will solve (13) using a semi-discrete finite di↵erence formulation based on the SBP-SAT technique [10,11,12,13]. The reader is referred to [2,3] for complete technical details.…”
Section: The Semi-discrete Formulationmentioning
confidence: 99%
“…More details on this productive and well tested technique is given below. For a read-up, see [3], [11], [13], [14], [20], [19], [21], [15], [2], [5]. A recipe for constructing a stable and convergent scheme when using the SBP-SAT technique is to choose the so called penalty parameters such that an energy-estimate is obtained.…”
Section: Recipe For Constructing a Schemementioning
confidence: 99%
“…More details on the weak imposition of boundary and interface conditions using the SAT technique will be given below. For a read-up on this technique see [3], [11], [13], [14], [20], [19], [21], [15]. By multiplying (17) from the left with U T (P ⊗ I) we obtain…”
Section: Sbp Operators and Weak Non Characteristic Boundary Conditionsmentioning
confidence: 99%