Orthogonal polynomials and some cubature formulae for an integral with radially symmetric weight (Q1803489)
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scientific article; zbMATH DE number 220933
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Orthogonal polynomials and some cubature formulae for an integral with radially symmetric weight |
scientific article; zbMATH DE number 220933 |
Statements
Orthogonal polynomials and some cubature formulae for an integral with radially symmetric weight (English)
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29 June 1993
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A linear space of polynomials of order \(t\) which are orthogonal with respect to a radially symmetric weight is studied. There is obtained a direct sum of subspaces which are defined by the Gauss representation of the highest member of the obtained expansion. Cubature formulas on the basis of the constructed expansion are also obtained.
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cubature formulas
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Gauss representation
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0.9169941
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0.90661746
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0.90636015
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0.9057106
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0.9007791
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0.89169234
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