基于等距节点的数值求积公式在Brownian桥测度下的平均误差
THE AVERAGE ERROR OF THE NUMERICAL QUADRATURE FORMULA BASED ON THE EQUIDISTANT NODES ON BROWNIAN BRIDGE MEASURE
摘要
本文讨论了基于等距节点的数值求积公式在Brownian桥测度下的平均误差,得到了相应量的准确值。
We discuss the average error of the numerical quadrature formula based on the equidistant nodes on Brownian bridge measure. We obtain its corresponding values.
出处
《井冈山大学学报(自然科学版)》
2012年第2期11-13,共3页
Journal of Jinggangshan University (Natural Science)
参考文献5
-
1Traub J F,Wasilkowski G W,Wozniakowski H. Information-Based Complexity[M].New York:Academic Press,Inc,1988.
-
2Klaus R. Average-case analysis of numerical problems[M].Berlin-Heidelberg-New York:SpringerVerlag,2000.
-
3许贵桥,杜英芳.三角多项式算子在BroWnian桥测度下的平均误差[J].数学学报(中文版),2009,52(3):523-534. 被引量:2
-
4Lifshits M A. Gaussian Random Functions[M].Kluwer,Dordrecht,1995.
-
5李贤平.概率论基础[M]北京:高等教育出版社,2002.
二级参考文献9
-
1Traub d. F., Wasilkowski G. W., Wozniakowski H., Information-Based Complexity, New York: Academic Press, 1988.
-
2Klaus R., Approximation and optimization on the Wiener space, J. Complexity, 1990, 6: 337-364.
-
3Hickernell F. J., Wozniakowski H., Integration and approximation in arbitrary dimensions, Adv. Comput. Math., 2000, 12: 25-58.
-
4Mark K., Leszek P., Information-based nonlinear approximation: an average case setting, J. Uomplexity, 2005, 21: 211-229.
-
5Klaus R., Average-case Analysis of Numerical Problems, New York: Springer-Verlag, 2000.
-
6Xu G. Q., The average error for lagrange interpolation and Hermite-Fejer interpolation on the Wiener space, Acta Mathematica Sinica, Chinese Series, 2007, 50(6): 1281-1296.
-
7Lifshits M. A., Ganssian Random Functions, Kluwer: Dordrecht, 1995.
-
8Zygmund A., Trigonometric Series II, New York: Cambridge Univ. Press, 1959.
-
9Devore R. A., Lorentz G. G., Constructive Approximation, Berlin: Springer-Verlag, 1993.
