Add to ORKGA notion of discrepancy is introduced, which represents the integration error on spaces of \(r\)-smooth periodic functions. It generalizes the diaphony and constitutes a periodic counterpart to the classical \(L_2\)-discrepancy as weil as \(r\)-smooth versions of it introduced recently by Paskov [Pas93]. Based on previous work [FH96], we develop an efficient algorithm for computing periodic discrepancies for quadrature formulas possessing certain tensor product structures, in particular, for Smolyak quadrature rules (also called sparse grid methods). Furthermore, fast algorithms of computing periodic discrepancies for lattice rules can easily be derived from well-known properties of lattices. On this basis we carry out numerical comparisons...
We present two algorithms for multivariate numerical integration of smooth periodic functions. The c...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
A notion of discrepancy is introduced, which represents the integration error on spaces of r-smooth ...
AbstractIn recent years, Smolyak quadrature rules (also called quadratures on hyperbolic cross point...
AbstractIn recent years, Smolyak quadrature rules (also called quadratures on hyperbolic cross point...
AbstractThis paper reviews the use of lattice methods for the approximate integration of smooth peri...
The trapezoidal quadrature rule on a uniform grid has spectral accuracy when integrating C ∞ periodi...
MCQMC2010Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces o...
In a series of papers, in 1993, 1994 & 1996 (see [NS93,NS94,NS96]), Ian Sloan together with Harald N...
We introduce a new method to approximate integrals $\int_{\mathbb{R}^d} f(\boldsymbol{x}) \, \mathrm...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
AbstractWe present two algorithms for multivariate numerical integration of smooth periodic function...
A family of simple, periodic basis functions with 'built-in' discontinuities are introduced, and the...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
We present two algorithms for multivariate numerical integration of smooth periodic functions. The c...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...
A notion of discrepancy is introduced, which represents the integration error on spaces of r-smooth ...
AbstractIn recent years, Smolyak quadrature rules (also called quadratures on hyperbolic cross point...
AbstractIn recent years, Smolyak quadrature rules (also called quadratures on hyperbolic cross point...
AbstractThis paper reviews the use of lattice methods for the approximate integration of smooth peri...
The trapezoidal quadrature rule on a uniform grid has spectral accuracy when integrating C ∞ periodi...
MCQMC2010Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces o...
In a series of papers, in 1993, 1994 & 1996 (see [NS93,NS94,NS96]), Ian Sloan together with Harald N...
We introduce a new method to approximate integrals $\int_{\mathbb{R}^d} f(\boldsymbol{x}) \, \mathrm...
Quasi-Monte Carlo methods can be used to approximate integrals in various weighted spaces of functio...
AbstractWe present two algorithms for multivariate numerical integration of smooth periodic function...
A family of simple, periodic basis functions with 'built-in' discontinuities are introduced, and the...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
We present two algorithms for multivariate numerical integration of smooth periodic functions. The c...
We develop algorithms for multivariate integration and approximation in the weighted half-period cos...
High-dimensional integrals arise in a variety of areas, including quantum physics, the physics and c...