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CORR
2000
Springer

Faster Evaluation of Multidimensional Integrals

13 years 11 months ago
Faster Evaluation of Multidimensional Integrals
In a recent paper Keister proposed two quadrature rules as alternatives to Monte Carlo for certain multidimensional integrals and reported his test results. In earlier work we had shown that the quasi-Monte Carlo method with generalized Faure points is very effective for a variety of high dimensional integrals occuring in mathematical finance. In this paper we report test results of this method on Keister's examples of dimension 9 and 25, and also for examples of dimension 60, 80 and 100. For the 25 dimensional integral we achieved accuracy of 10-2 with less than 500 points while the two methods tested by Keister used more than 220, 000 points. In all of our tests, for n sample points we obtained an empirical convergence rate proportional to n-1 rather than the n-1/2 of Monte Carlo.
Anargyros Papageorgiou, Joseph F. Traub
Added 17 Dec 2010
Updated 17 Dec 2010
Type Journal
Year 2000
Where CORR
Authors Anargyros Papageorgiou, Joseph F. Traub
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