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A Generalized Discrepancy and Quadrature Error Bound |
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| Authors: | Fred J Hickernell |
| Institution: | Department of Mathematics, Hong Kong Baptist University, Kowloon Tong, Hong Kong |
| Abstract: | An error bound for multidimensional quadrature is derived that includes the Koksma-Hlawka inequality as a special case. This error bound takes the form of a product of two terms. One term, which depends only on the integrand, is defined as a generalized variation. The other term, which depends only on the quadrature rule, is defined as a generalized discrepancy. The generalized discrepancy is a figure of merit for quadrature rules and includes as special cases the  -star discrepancy and  that arises in the study of lattice rules. |
| Keywords: | Figure of merit multidimensional integration number-theoretic nets and sequences quasi-random sets variation |
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