AbstractIn this paper cubature formulae are obtained for evaluating integrals on the hyperoctahedron, which are exact for any polynomial of degree not exceeding 9, and are invariant with respect to the group of all orthogonal transformations of the hyperoctahedron into itself
The construction of a cubature formula of strength t for the unit sphere Ω d in ℝ d amounts to findi...
AbstractWe consider cubature formulas to approximate multivariate integrals that remain unchanged un...
A new algebraic cubature formula of degree 2n+1 for the product Chebyshev measure in the d-cube with...
AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, wh...
AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, wh...
AbstractA method of constructing three-dimensional cubature formulae of high degree for three-dimens...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractWe are concerned with the construction of high degree formulae for circular symmetric planar...
AbstractAn important quality criterion of cubature formulae is their algebraic or trigonometric degr...
AbstractAn important quality criterion of cubature formulae is their algebraic or trigonometric degr...
AbstractWe are concerned with the construction of high degree formulae for circular symmetric planar...
AbstractWe consider cubature formulas to approximate multivariate integrals that remain unchanged un...
AbstractWe present five new cubature formula in the triangle and square for exact integration of pol...
AbstractThe connection between orthogonal polynomials and cubature formulae for the approximation of...
The construction of a cubature formula of strength t for the unit sphere Ω d in ℝ d amounts to findi...
The construction of a cubature formula of strength t for the unit sphere Ω d in ℝ d amounts to findi...
AbstractWe consider cubature formulas to approximate multivariate integrals that remain unchanged un...
A new algebraic cubature formula of degree 2n+1 for the product Chebyshev measure in the d-cube with...
AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, wh...
AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, wh...
AbstractA method of constructing three-dimensional cubature formulae of high degree for three-dimens...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractWe are concerned with the construction of high degree formulae for circular symmetric planar...
AbstractAn important quality criterion of cubature formulae is their algebraic or trigonometric degr...
AbstractAn important quality criterion of cubature formulae is their algebraic or trigonometric degr...
AbstractWe are concerned with the construction of high degree formulae for circular symmetric planar...
AbstractWe consider cubature formulas to approximate multivariate integrals that remain unchanged un...
AbstractWe present five new cubature formula in the triangle and square for exact integration of pol...
AbstractThe connection between orthogonal polynomials and cubature formulae for the approximation of...
The construction of a cubature formula of strength t for the unit sphere Ω d in ℝ d amounts to findi...
The construction of a cubature formula of strength t for the unit sphere Ω d in ℝ d amounts to findi...
AbstractWe consider cubature formulas to approximate multivariate integrals that remain unchanged un...
A new algebraic cubature formula of degree 2n+1 for the product Chebyshev measure in the d-cube with...
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