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Hauptverfasser: Lalicata, Leonardo Maria, Bressan, Andrea, Pittaluga, Simone, Tamellini, Lorenzo, Gallipoli, Domenico
Format: Preprint
Veröffentlicht: 2024
Schlagworte:
Online-Zugang:https://arxiv.org/abs/2412.01598
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author Lalicata, Leonardo Maria
Bressan, Andrea
Pittaluga, Simone
Tamellini, Lorenzo
Gallipoli, Domenico
author_facet Lalicata, Leonardo Maria
Bressan, Andrea
Pittaluga, Simone
Tamellini, Lorenzo
Gallipoli, Domenico
contents This paper presents an optimised algorithm implementing the method of slices for analysing the stability of slopes. The algorithm adopts an improved physically based parameterisation of slip lines according to their geometrical characteristics at the endpoints, which facilitates the identification of all viable failure mechanisms while excluding unrealistic ones. The minimisation routine combines a preliminary discrete calculation of the factor of safety over a coarse grid covering the above parameter space with a subsequent continuous exploration of the most promising region via the simplex optimisation. This reduces computational time up to about 92% compared to conventional approaches that rely on the discrete calculation of the factor of safety over a fine grid covering the entire search space. Significant savings of computational time are observed with respect to recently published heuristic algorithms, which enable a continuous exploration of the entire parametric space. These efficiency gains are particularly advantageous for numerically demanding applications like, for example, the statistical assessment of slopes with uncertain mechanical, hydraulic and geometrical properties. The novel physically based parametrisation of the slip geometry and the adoption of a continuous local search allow exploration of parameter combinations that are necessarily neglected by standard grid-based approaches, leading to an average improvement in accuracy of about 5%.
format Preprint
id arxiv_https___arxiv_org_abs_2412_01598
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle An efficient slope stability algorithm with physically consistent parametrisation of slip surfaces
Lalicata, Leonardo Maria
Bressan, Andrea
Pittaluga, Simone
Tamellini, Lorenzo
Gallipoli, Domenico
Computational Engineering, Finance, and Science
This paper presents an optimised algorithm implementing the method of slices for analysing the stability of slopes. The algorithm adopts an improved physically based parameterisation of slip lines according to their geometrical characteristics at the endpoints, which facilitates the identification of all viable failure mechanisms while excluding unrealistic ones. The minimisation routine combines a preliminary discrete calculation of the factor of safety over a coarse grid covering the above parameter space with a subsequent continuous exploration of the most promising region via the simplex optimisation. This reduces computational time up to about 92% compared to conventional approaches that rely on the discrete calculation of the factor of safety over a fine grid covering the entire search space. Significant savings of computational time are observed with respect to recently published heuristic algorithms, which enable a continuous exploration of the entire parametric space. These efficiency gains are particularly advantageous for numerically demanding applications like, for example, the statistical assessment of slopes with uncertain mechanical, hydraulic and geometrical properties. The novel physically based parametrisation of the slip geometry and the adoption of a continuous local search allow exploration of parameter combinations that are necessarily neglected by standard grid-based approaches, leading to an average improvement in accuracy of about 5%.
title An efficient slope stability algorithm with physically consistent parametrisation of slip surfaces
topic Computational Engineering, Finance, and Science
url https://arxiv.org/abs/2412.01598