AbstractThis paper is devoted to construct a family of fifth degree cubature formulae for n-cube with symmetric measure and n-dimensional spherically symmetrical region. The formula forn-cube contains at most n2+5n+3 points and for n-dimensional spherically symmetrical region contains only n2+3n+3 points. Moreover, the numbers can be reduced to n2+3n+1 and n2+n+1 if n=7 respectively, the latter of which is minimal
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
We construct cubature formulas on spheres supported by homothetic images of shells in some Euclidian...
We construct cubature formulas on spheres supported by homothetic images of shells in some Euclidian...
AbstractThis paper is devoted to construct a family of fifth degree cubature formulae for n-cube wit...
AbstractWe consider an imbedded family of cubature formulae for n-dimensional fully symmetric produc...
AbstractA new method is described for the construction of cubature formulae of degree 4k − 3 for two...
AbstractIn this note cubature formulae of degree 5 are studied for n-dimensional integrals over the ...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
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...
AbstractA numerical method of constructing 25-point and 26-point cubature formulas with degree of ex...
We study cubature formulas for d-dimensional integrals with an arbitrary symmetric weight function o...
AbstractA new method is described for the construction of cubature formulae of degree 4k − 3 for two...
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 examine the method of Cartesian product to construct cubature formulae on the unit sphere...
We construct cubature formulas on spheres supported by homothetic images of shells in some Euclidian...
We construct cubature formulas on spheres supported by homothetic images of shells in some Euclidian...
AbstractThis paper is devoted to construct a family of fifth degree cubature formulae for n-cube wit...
AbstractWe consider an imbedded family of cubature formulae for n-dimensional fully symmetric produc...
AbstractA new method is described for the construction of cubature formulae of degree 4k − 3 for two...
AbstractIn this note cubature formulae of degree 5 are studied for n-dimensional integrals over the ...
AbstractWe examine the method of Cartesian product to construct cubature formulae on the unit sphere...
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...
AbstractA numerical method of constructing 25-point and 26-point cubature formulas with degree of ex...
We study cubature formulas for d-dimensional integrals with an arbitrary symmetric weight function o...
AbstractA new method is described for the construction of cubature formulae of degree 4k − 3 for two...
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 examine the method of Cartesian product to construct cubature formulae on the unit sphere...
We construct cubature formulas on spheres supported by homothetic images of shells in some Euclidian...
We construct cubature formulas on spheres supported by homothetic images of shells in some Euclidian...
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