论文信息 - Bounding Approximations to Some Quadratic Limit States

Bounding Approximations to Some Quadratic Limit States

In second‐order reliability problems the limit state surface is (locally) replaced by a quadratic surface. This leads to a study of quadratic forms in the basic uncertainty variables. The present paper exploits a simple, closed‐form expression for the distribution function of a special class of quadratic forms in zero‐mean Gaussian variables to obtain bounds on the distribution function of general quadratic forms in such variables. It is shown that these bounds can be used to obtain useful estimates of the failure probability for such models.

Arvid Naess

[1] Georg Lindgren,et al. Extreme values and crossings for the X 2-Process and Other Functions of Multidimensional Gaussian Processes, by Reliability Applications , 1980, Advances in Applied Probability.

[2] Arvid Naess. The response statistics of non-linear, second-order transformations to Gaussian loads , 1987 .

[3] R. Rackwitz,et al. Quadratic Limit States in Structural Reliability , 1979 .

[4] S. Rice. Distribution of Quadratic Forms in Normal Random Variables—Evaluation by Numerical Integration , 1980 .

[5] Irene A. Stegun,et al. Handbook of Mathematical Functions. , 1966 .

[6] István Deák,et al. Three digit accurate multiple normal probabilities , 1980 .

[7] R. Rackwitz,et al. Non-Normal Dependent Vectors in Structural Safety , 1981 .

[8] A. Naess. THE STATISTICAL DISTRIBUTION OF SECOND-ORDER SLOWLY VARYING FORCES AND MOTIONS , 1986 .

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

[10] A. Naess. STATISTICAL ANALYSIS OF SECOND-ORDER RESPONSE OF MARINE STRUCTURES , 1985 .

[11] M. Kac,et al. On the Theory of Noise in Radio Receivers with Square Law Detectors , 1947 .

[12] K. Breitung. Asymptotic approximations for multinormal integrals , 1984 .