An improved high-order statistical moment method for structural reliability analysis with insufficient data

The fourth-order moment method for reliability analysis of structural systems can be practically applied to effectively address the problem of reliability calculation and analysis with insufficient probability data. For complicated reliability analysis problems, however, this method can lead to inaccurate and unstable reliability calculation results. In this paper, an improved high-order statistical moment method for structural reliability analysis with insufficient data is presented. The presented method is inferred using the properties of statistical moment of standard normal distribution parameter and therefore is possible to obtain more stable and accurate calculation of the reliability indexes of a structural system with insufficient probability data. Two numerical examples are provided to show the performance of the presented method. The example results have shown that the method proposed in this paper not only improves the calculation accuracy and stability, but also brings the calculation results closer to the project conditions. The developed high-moment method for reliability calculation of structural systems provides a practical and effective theoretical base and technical support for the reliability design of structural systems.

[1]  A. Kiureghian,et al.  Second-Order Reliability Approximations , 1987 .

[2]  Andrzej S. Nowak,et al.  Integration formulas to evaluate functions of random variables , 1988 .

[3]  Michel van Tooren,et al.  An enhanced unified uncertainty analysis approach based on first order reliability method with single-level optimization , 2013, Reliab. Eng. Syst. Saf..

[4]  Emilio Rosenblueth,et al.  Two-point estimates in probabilities , 1981 .

[5]  A. Kiureghian,et al.  STRUCTURAL RELIABILITY UNDER INCOMPLETE PROBABILITY INFORMATION , 1986 .

[6]  A. M. Hasofer,et al.  Exact and Invariant Second-Moment Code Format , 1974 .

[7]  M. Kendall,et al.  Kendall's advanced theory of statistics , 1995 .

[8]  Byung Man Kwak,et al.  Efficient statistical tolerance analysis for general distributions using three-point information , 2002 .

[9]  Samuel Kotz,et al.  Discrete Distributions: Distributions in Statistics , 1971 .

[10]  M. Shinozuka Basic Analysis of Structural Safety , 1983 .

[11]  Fred Moses,et al.  System reliability developments in structural engineering , 1982 .

[12]  H. Cramér Mathematical methods of statistics , 1947 .

[13]  H. Hong POINT-ESTIMATE MOMENT-BASED RELIABILITY ANALYSIS , 1996 .

[14]  A. Kiureghian,et al.  Multivariate distribution models with prescribed marginals and covariances , 1986 .

[15]  M. Rosenblatt Remarks on a Multivariate Transformation , 1952 .

[16]  Chan Ghee Koh,et al.  First-Order Reliability Method for Structural Reliability Analysis in the Presence of Random and Interval Variables , 2015 .

[17]  Yan-Gang Zhao,et al.  New Point Estimates for Probability Moments , 2000 .

[18]  Yan-Gang Zhao,et al.  Second-Order Third-Moment Reliability Method , 2002 .

[19]  Zhenzhou Lu,et al.  A non-probabilistic robust reliability method for analysis and design optimization of structures with uncertain-but-bounded parameters , 2015 .

[20]  Bangchun Wen,et al.  First passage of uncertain single degree-of-freedom nonlinear oscillators , 1998 .

[21]  Zhen Hu,et al.  First Order Reliability Method With Truncated Random Variables , 2012 .

[22]  Fred Moses,et al.  Reliability of Structural Systems , 1974 .

[23]  Yan-Gang Zhao,et al.  Moment methods for structural reliability , 2001 .

[24]  H. Saunders,et al.  Probabilistic Engineering Design—Principles and Applications , 1987 .

[25]  P. E. James T. P. Yao,et al.  Probability, Reliability and Statistical Methods in Engineering Design , 2001 .

[26]  M. Tichý First-order third-moment reliability method , 1994 .

[27]  E. Rosenblueth Point estimates for probability moments. , 1975, Proceedings of the National Academy of Sciences of the United States of America.

[28]  Bora Gencturk,et al.  Further development of matrix-based system reliability method and applications to structural systems , 2012 .