Localising the Smallest Stiffness and its Direction of a Homogeneous Structure by Spectral and Optimisation Approaches

TL;DR

This paper introduces spectral and optimization methods to accurately identify the smallest structural stiffness and its direction, facilitating structural health monitoring without extensive experiments.

Contribution

It presents a novel modal-decomposition-based relation between modal and static stiffness, enabling efficient analysis of the smallest stiffness and its orientation.

Findings

Spectral and optimization approaches yield similar results for smallest stiffness.

Methods are effective for structural health monitoring.

Approaches reduce reliance on extensive experimental data.

Abstract

Structural stiffness plays an important role in engineering design. The analysis of stiffness requires precise experiments and computational models that can be difficult or time-consuming to procure. A novel relation between modal and static stiffness based on modal decomposition is introduced in this study. This relation allows analysing the smallest structural stiffness and its direction. Further, it is shown that the smallest stiffness can be found using an optimisation algorithm that is based on the maximisation of structural compliance. Both approaches are compared on several computational examples leading to similar results in terms of smallest stiffness and its direction. The proposed approaches serve as quantitative/qualitative tools for the analyses of structural stiffness, particularly in structural health monitoring.