Seismic Reliability Analysis of an Excavation Slope Based on Direct Probability Integral Method

4区工程技术 Q1 Mathematics

Mathematical Problems in Engineering Pub Date : 2024-03-30 DOI:10.1155/2024/7012424

Junguo Han, Yuanmin Yang, Muzi Du, Rui Pang

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引用次数: 0

Abstract

China, situated in the circum-Pacific seismic belt, experiences frequent seismic activity and faces diverse geological conditions, making structural stability of paramount importance, especially under seismic conditions. The majority of current earthquake generation methods do not consider the nonstationary nature of earthquakes. This paper introduces a spectral representation-random function model for generating nonstationary earthquakes, effectively simulating stochastic seismic ground motion. Furthermore, traditional slope stability analysis methods are deterministic and incapable of providing probabilistic assessments of slope instability. Therefore, this paper proposes a unified framework for static and dynamic structural reliability analysis based on the direct probability integration method, quantifying the impact of stochastic seismic ground motion on the dynamic reliability of slope stability. Finally, the proposed methods are applied to an excavation slope in Nanjing, using sliding displacement and safety factors as evaluation criteria to study the reliability of the slope under the influence of stochastic seismic events.

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基于直接概率积分法的开挖边坡地震可靠性分析

中国地处环太平洋地震带，地震活动频繁，地质条件多样，结构稳定性至关重要，尤其是在地震条件下。目前大多数地震发生方法都没有考虑地震的非稳态性。本文介绍了一种用于生成非稳态地震的频谱表示-随机函数模型，可有效模拟随机地震地面运动。此外，传统的边坡稳定性分析方法是确定性的，无法对边坡不稳定性进行概率评估。因此，本文基于直接概率积分法，提出了静态和动态结构可靠性分析的统一框架，量化了随机地震地面运动对边坡稳定性动态可靠性的影响。最后，将提出的方法应用于南京某开挖边坡，以滑动位移和安全系数为评价标准，研究随机地震事件影响下边坡的可靠性。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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来源期刊

Mathematical Problems in Engineering 工程技术-工程：综合

CiteScore

4.00

自引率

0.00%

发文量

2853

审稿时长

4.2 months

期刊介绍： Mathematical Problems in Engineering is a broad-based journal which publishes articles of interest in all engineering disciplines. Mathematical Problems in Engineering publishes results of rigorous engineering research carried out using mathematical tools. Contributions containing formulations or results related to applications are also encouraged. The primary aim of Mathematical Problems in Engineering is rapid publication and dissemination of important mathematical work which has relevance to engineering. All areas of engineering are within the scope of the journal. In particular, aerospace engineering, bioengineering, chemical engineering, computer engineering, electrical engineering, industrial engineering and manufacturing systems, and mechanical engineering are of interest. Mathematical work of interest includes, but is not limited to, ordinary and partial differential equations, stochastic processes, calculus of variations, and nonlinear analysis.