Abstract
The geometry of beams is such that the two dimensions of the cross-section are of the same order of magnitude and smaller than the third one, the length of the mid-line. A Taylor–Young expansion of the displacement field truncated at fifth order with respect to the transverse dimension is assumed. For beams with two-fold symmetric cross-sections commonly used (e.g., circular, square, rectangular, and elliptical), the two-dimensional beam model is obtained by truncating the potential energy. After giving, the rule for truncation, we define and justify this model by analyzing the Euler–Lagrange equations. Moreover, we can show that this new nonlinear beam model is a uniformly valid beam theory, independent of the orders of magnitude of the applied loads. Indeed, the use of the asymptotic expansion method allows to recover from this nonlinear beam model, five well-known beam models obtained by the rigorous convergence results or the asymptotic expansion method in the literature to the leading order.
Affiliated Institutions
Related Publications
Absolute Measurement of Two-Photon Cross Sections
A method is presented which yields two-photon cross-section values $\ensuremath{\delta}$ which are independent of the statistical properties of the light beam. A two-cell arrang...
Beam propagation and optical power limiting with nonlinear media
A simple model for absorption and refraction of a laser beam by a bounded nonlinear medium and for diffraction during the beam's subsequent free-space propagation is used to cal...
Efficient R-Estimation of Principal and Common Principal Components
We propose rank-based estimators of principal components, both in the one-sample and, under the assumption of common principal components, in the m-sample cases. Those estimator...
From Maxwell to paraxial wave optics
In this paper we are concerned with the propagation of a light beam through an inhomogeneous, isotropic medium with a possibly nonlinear index of refraction. The customary parax...
On the Construction and Comparison of Difference Schemes
Previous article Next article On the Construction and Comparison of Difference SchemesGilbert StrangGilbert Stranghttps://doi.org/10.1137/0705041PDFBibTexSections ToolsAdd to fa...
Publication Info
- Year
- 2025
- Type
- article
- Citations
- 0
- Access
- Closed
External Links
Social Impact
Altmetric
PlumX Metrics
Social media, news, blog, policy document mentions
Citation Metrics
0
OpenAlex
0
Influential
0
CrossRef
Cite This
Erick Pruchnicki
(2025).
On a nonlinear uniformly valid model for homogeneous beams with double symmetric cross-section.
Mathematics and Mechanics of Solids
.
https://doi.org/10.1177/10812865251366664
Identifiers
- DOI
- 10.1177/10812865251366664