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Main Author: Dhanakoti, Siva Prasad Chakri
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2407.07601
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author Dhanakoti, Siva Prasad Chakri
author_facet Dhanakoti, Siva Prasad Chakri
contents The application of variational principles for analyzing problems in the physical sciences is widespread. Cantilever-like problems, where one end is fixed and the other end is free, have received less attention in terms of their stability despite their prevalence. In this article, we establish stability conditions for these problems by examining the second variation of the energy functional through the generalized Jacobi condition. This requires computing conjugate points determined by solving a set of initial value problems from the linearized equilibrium equations. We apply these conditions to investigate the nonlinear stability of intrinsically curved elastic cantilevers subject to an end load. The rod deformations are modelled using Kirchhoff rod theory. The role of intrinsic curvature in inducing complex nonlinear phenomena, such as snap-back instability, is particularly emphasized. The numerical examples highlight its dependence on the system parameters. These examples illustrate potential applications in the design of flexible soft robot arms and innovative mechanisms.
format Preprint
id arxiv_https___arxiv_org_abs_2407_07601
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Stability of Cantilever-like Structures with Applications to Soft Robot Arms
Dhanakoti, Siva Prasad Chakri
Soft Condensed Matter
Classical Analysis and ODEs
Applied Physics
The application of variational principles for analyzing problems in the physical sciences is widespread. Cantilever-like problems, where one end is fixed and the other end is free, have received less attention in terms of their stability despite their prevalence. In this article, we establish stability conditions for these problems by examining the second variation of the energy functional through the generalized Jacobi condition. This requires computing conjugate points determined by solving a set of initial value problems from the linearized equilibrium equations. We apply these conditions to investigate the nonlinear stability of intrinsically curved elastic cantilevers subject to an end load. The rod deformations are modelled using Kirchhoff rod theory. The role of intrinsic curvature in inducing complex nonlinear phenomena, such as snap-back instability, is particularly emphasized. The numerical examples highlight its dependence on the system parameters. These examples illustrate potential applications in the design of flexible soft robot arms and innovative mechanisms.
title Stability of Cantilever-like Structures with Applications to Soft Robot Arms
topic Soft Condensed Matter
Classical Analysis and ODEs
Applied Physics
url https://arxiv.org/abs/2407.07601