Good lattice rules based on the general weighted star discrepancy
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- by Vasile Sinescu and Stephen Joe PDF
- Math. Comp. 76 (2007), 989-1004 Request permission
Abstract:
We study the problem of constructing rank-$1$ lattice rules which have good bounds on the “weighted star discrepancy”. Here the non-negative weights are general weights rather than the product weights considered in most earlier works. In order to show the existence of such good lattice rules, we use an averaging argument, and a similar argument is used later to prove that these lattice rules may be obtained using a component-by-component (CBC) construction of the generating vector. Under appropriate conditions on the weights, these lattice rules satisfy strong tractability bounds on the weighted star discrepancy. Particular classes of weights known as “order-dependent” and “finite-order” weights are then considered and we show that the cost of the construction can be very much reduced for these two classes of weights.References
- R. Cools, F.Y. Kuo and D. Nuyens, Constructing embedded lattice rules for multivariate integration, SIAM J. Sci Comput., to appear.
- Josef Dick, Ian H. Sloan, Xiaoqun Wang, and Henryk Woźniakowski, Good lattice rules in weighted Korobov spaces with general weights, Numer. Math. 103 (2006), no. 1, 63–97. MR 2207615, DOI 10.1007/s00211-005-0674-6
- Fred J. Hickernell, A generalized discrepancy and quadrature error bound, Math. Comp. 67 (1998), no. 221, 299–322. MR 1433265, DOI 10.1090/S0025-5718-98-00894-1
- Fred J. Hickernell and Harald Niederreiter, The existence of good extensible rank-1 lattices, J. Complexity 19 (2003), no. 3, 286–300. Numerical integration and its complexity (Oberwolfach, 2001). MR 1984115, DOI 10.1016/S0885-064X(02)00026-2
- Fred J. Hickernell, Ian H. Sloan, and Grzegorz W. Wasilkowski, On tractability of weighted integration over bounded and unbounded regions in $\Bbb R^s$, Math. Comp. 73 (2004), no. 248, 1885–1901. MR 2059741, DOI 10.1090/S0025-5718-04-01624-2
- Fred J. Hickernell, Ian H. Sloan, and Grzegorz W. Wasilkowski, On strong tractability of weighted multivariate integration, Math. Comp. 73 (2004), no. 248, 1903–1911. MR 2059742, DOI 10.1090/S0025-5718-04-01653-9
- Stephen Joe and Ian H. Sloan, On computing the lattice rule criterion $R$, Math. Comp. 59 (1992), no. 200, 557–568. MR 1134733, DOI 10.1090/S0025-5718-1992-1134733-2
- Stephen Joe, Component by component construction of rank-1 lattice rules having $O(n^{-1}(\ln (n))^d)$ star discrepancy, Monte Carlo and quasi-Monte Carlo methods 2002, Springer, Berlin, 2004, pp. 293–298. MR 2076940
- Stephen Joe, Construction of good rank-1 lattice rules based on the weighted star discrepancy, Monte Carlo and quasi-Monte Carlo methods 2004, Springer, Berlin, 2006, pp. 181–196. MR 2208709, DOI 10.1007/3-540-31186-6_{1}2
- Gerhard Larcher, A best lower bound for good lattice points, Monatsh. Math. 104 (1987), no. 1, 45–51. MR 903774, DOI 10.1007/BF01540524
- Dirk Nuyens and Ronald Cools, Fast algorithms for component-by-component construction of rank-1 lattice rules in shift-invariant reproducing kernel Hilbert spaces, Math. Comp. 75 (2006), no. 254, 903–920. MR 2196999, DOI 10.1090/S0025-5718-06-01785-6
- Harald Niederreiter, Existence of good lattice points in the sense of Hlawka, Monatsh. Math. 86 (1978/79), no. 3, 203–219. MR 517026, DOI 10.1007/BF01659720
- Harald Niederreiter, Random number generation and quasi-Monte Carlo methods, CBMS-NSF Regional Conference Series in Applied Mathematics, vol. 63, Society for Industrial and Applied Mathematics (SIAM), Philadelphia, PA, 1992. MR 1172997, DOI 10.1137/1.9781611970081
- I. H. Sloan and S. Joe, Lattice methods for multiple integration, Oxford Science Publications, The Clarendon Press, Oxford University Press, New York, 1994. MR 1442955
- Ian H. Sloan, Xiaoqun Wang, and Henryk Woźniakowski, Finite-order weights imply tractability of multivariate integration, J. Complexity 20 (2004), no. 1, 46–74. MR 2031558, DOI 10.1016/j.jco.2003.11.003
- Ian H. Sloan and Henryk Woźniakowski, When are quasi-Monte Carlo algorithms efficient for high-dimensional integrals?, J. Complexity 14 (1998), no. 1, 1–33. MR 1617765, DOI 10.1006/jcom.1997.0463
- Xiaoqun Wang and Ian H. Sloan, Why are high-dimensional finance problems often of low effective dimension?, SIAM J. Sci. Comput. 27 (2005), no. 1, 159–183. MR 2201179, DOI 10.1137/S1064827503429429
- S. C. Zaremba, Some applications of multidimensional integration by parts, Ann. Polon. Math. 21 (1968), 85–96. MR 235731, DOI 10.4064/ap-21-1-85-96
Additional Information
- Vasile Sinescu
- Affiliation: Department of Mathematics, University of Waikato, Hamilton, New Zealand
- Email: vs27@waikato.ac.nz
- Stephen Joe
- Affiliation: Department of Mathematics, University of Waikato, Hamilton, New Zealand
- Email: stephenj@math.waikato.ac.nz
- Received by editor(s): August 23, 2005
- Received by editor(s) in revised form: April 20, 2006
- Published electronically: December 12, 2006
- © Copyright 2006
American Mathematical Society
The copyright for this article reverts to public domain 28 years after publication. - Journal: Math. Comp. 76 (2007), 989-1004
- MSC (2000): Primary 65D30, 65D32; Secondary 11K38
- DOI: https://doi.org/10.1090/S0025-5718-06-01943-0
- MathSciNet review: 2291846