Sard kernel theorems on triangular domains with application to finite element error bounds

Barnhill, Robert E.; Gregory, John

doi:10.1007/bf01399411

Cited by 47 publications

(34 citation statements)

References 4 publications

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“…(e.g., one less, a(h 3 ), for 2nd order problems). Apreeise statement of such error bounds, including the constants so that the bounds become computable, has been made by Barnhill and Gregor,y [12]. In this paper we are emphasizing the geometry and algebra of blending function methods, not their analysis.…”

Section: Blending Function Interpolation Over Rectangleshmentioning

confidence: 97%

Blending Function Interpolation: A Survey and Some New Results

Barnhill

1976

Numerische Methoden Der Approximationstheorie/Numerical Methods of Approximation Theory

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Section: Blending Function Interpolation Over Rectangleshmentioning

confidence: 97%

Blending Function Interpolation: A Survey and Some New Results

Barnhill

1976

Numerische Methoden Der Approximationstheorie/Numerical Methods of Approximation Theory

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“…Gordon, there have been constructed interpolation operators of Lagrange, Hermite and Birkhoff type, that interpolate the values of a given function or the values of the function and of certain of its derivatives on the boundary of a triangle with straight sides. These operators were applied in computer aided geometric design (see, e.g., [1]- [3], [5]]) and in finite element analysis (see, e.g., [1], [7], [8], [13], [17]- [19], [21], [22]). …”

Section: Related Reviewsmentioning

confidence: 99%

Extension of Some Positive and Linear Operators to Domains with Curved Sides

Cătinaş

2016

MATEC Web Conf.

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Abstract. There are constructed some Cheney-Sharma type operators defined on a square with one curved side. They are extensions of the Cheney-Sharma type operators of second kind, given by E.W. Cheney and A. Sharma in [14], to the case of a curved sided domain. There are constructed the univariate Cheney-Sharma type operators, their product and boolean sum operators and there are studied their properties, their orders of accuracy and the remainders of the corresponding approximation formulas. Finally, there are given some illustrative examples.

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“…This gap was resolved in [15]. The maximum angle condition for triangular elements was also investigated in terms of various norms in [2], [3], [4], [16], [15], [17], [18], [20], [22], [23], [24]. To obtain optimal interpolation properties of linear tetrahedral elements one has to impose (see [19]) the maximum angle condition for all triangular faces as well as a similar condition for all dihedral angles between faces.…”

Section: Introductionmentioning

confidence: 99%

On Synge-type angle condition for $d$-simplices

Hannukainen

Korotov

Křížek³

2017

Appl.Math.

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Abstract. The maximum angle condition of J. L. Synge was originally introduced in interpolation theory and further used in finite element analysis and applications for triangular and later also for tetrahedral finite element meshes. In this paper we present some of its generalizations to higher-dimensional simplicial elements. In particular, we prove optimal interpolation properties of linear simplicial elements in R d that degenerate in some way.

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Sard kernel theorems on triangular domains with application to finite element error bounds

Cited by 47 publications

References 4 publications

Blending Function Interpolation: A Survey and Some New Results

Blending Function Interpolation: A Survey and Some New Results

Extension of Some Positive and Linear Operators to Domains with Curved Sides

On Synge-type angle condition for $d$-simplices

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