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New finite-difference-based discrete models for Euler and Timoshenko beam problems | Synapse
March 3, 2026
New finite-difference-based discrete models for Euler and Timoshenko beam problems
ZS
Z.W. Song
Hong Kong Polytechnic University
ZY
Z. Yaw
Hong Kong Polytechnic University
SL
S.K. Lai
Hong Kong Polytechnic University
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Key Points
New finite-difference models improve solutions for Euler and Timoshenko beam problems, enhancing accuracy.
Key metrics show that these models provide better alignment with experimental data than traditional methods.
The analysis uses a combination of finite-difference approaches to evaluate both beam types across various conditions.
These findings highlight the potential of advanced discrete modeling techniques for structural engineering applications.
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Song et al. (Mon,) studied this question.
synapsesocial.com/papers/69a76563badf0bb9e87d8e9a
https://doi.org/https://doi.org/10.1016/j.engstruct.2025.122063