AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, which are exact for any polynomial of degree not exceeding 7, and are invariant with respect to the group of transformations of the regular simplex
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
AbstractWe obtain in explicit form the unique Gaussian cubature for balls (spheres) in Rn based on i...
AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, wh...
AbstractIn this paper cubature formulae are obtained for evaluating integrals on the hyperoctahedron...
AbstractIn this paper, we obtain cubature formulae for the n-simplex Tn, which are invariant under a...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
AbstractThis paper is devoted to construct a family of fifth degree cubature formulae for n-cube wit...
AbstractWe are concerned with the construction of high degree formulae for circular symmetric planar...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractIn this note cubature formulae of degree 5 are studied for n-dimensional integrals over the ...
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...
AbstractAn important quality criterion of cubature formulae is their algebraic or trigonometric degr...
AbstractA new method is described for the construction of cubature formulae of degree 4k − 3 for two...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
AbstractWe obtain in explicit form the unique Gaussian cubature for balls (spheres) in Rn based on i...
AbstractCubature formulae for evaluating integrals on the hypersphere in Rn for n⩾5 are obtained, wh...
AbstractIn this paper cubature formulae are obtained for evaluating integrals on the hyperoctahedron...
AbstractIn this paper, we obtain cubature formulae for the n-simplex Tn, which are invariant under a...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
AbstractThis paper is devoted to construct a family of fifth degree cubature formulae for n-cube wit...
AbstractWe are concerned with the construction of high degree formulae for circular symmetric planar...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractIn this note cubature formulae of degree 5 are studied for n-dimensional integrals over the ...
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...
AbstractAn important quality criterion of cubature formulae is their algebraic or trigonometric degr...
AbstractA new method is described for the construction of cubature formulae of degree 4k − 3 for two...
AbstractThe method of constructing minimal cubature rules with high algebraic degrees of exactness i...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
AbstractWe obtain in explicit form the unique Gaussian cubature for balls (spheres) in Rn based on i...
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