Multidimensional Cubature Formulas with Superpower Convergence

In many applications, multidimensional integrals over the unit hypercube arise, which are calculated using Monte Carlo methods. The convergence of the best of them turns out to be quite slow. In this paper, fundamentally new cubature formulas with superpower convergence based on improved Korobov grids and a special variable substitution are proposed. A posteriori error estimates are constructed, which are nearly indistinguishable from the actual accuracy. Examples of calculations illustrating the advantages of the proposed methods are given.

Authors
Belov A.A. 1, 2 , Tintul M.A.1
Number of issue
3
Language
English
Pages
514-518
Status
Published
Volume
108
Year
2023
Organizations
  • 1 Faculty of Physics, Lomonosov Moscow State University
  • 2 Peoples’ Friendship University of Russia (RUDN University)
Keywords
multidimensional integrals; Monte Carlo method; superpower convergence; Korobov grids; mathematics; general
Share

Other records