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Main Authors: Pandurangi, Shrinidhi S., Healey, Timothy J., Triantafyllidis, Nicolas
Format: Preprint
Published: 2019
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Online Access:https://arxiv.org/abs/1903.08775
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author Pandurangi, Shrinidhi S.
Healey, Timothy J.
Triantafyllidis, Nicolas
author_facet Pandurangi, Shrinidhi S.
Healey, Timothy J.
Triantafyllidis, Nicolas
contents Transverse wrinkles are known to appear in thin rectangular elastic sheets when stretched in the long direction. Numerically computed bifurcation diagrams for extremely thin, highly stretched films indicate entire orbits of wrinkling solutions, cf. Healey, et. al. [J. Nonlinear Sci., 23 (2013), pp.~777--805]. These correspond to arbitrary phase shifts of the wrinkled pattern in the transverse direction. While such behavior is normally associated with problems in the presence of a continuous symmetry group, an unloaded rectangular sheet possesses only a finite symmetry group. In order to understand this phenomenon, we consider a simpler problem more amenable to analysis -- a finite-length beam on a nonlinear softening foundation under axial compression. We first obtain asymptotic results via amplitude equations, that are valid as a certain non-dimensional beam length becomes sufficiently large. We deduce that any two phase-shifts of a solution differ from one another by exponentially small terms in that length. We validate this observation with numerical computations, indicating the presence of solution orbits for sufficiently long beams. We refer to this as "hidden asymptotic symmetry".
format Preprint
id arxiv_https___arxiv_org_abs_1903_08775
institution arXiv
publishDate 2019
record_format arxiv
spellingShingle Hidden Asymptotic Symmetry in Long Elastic Beams on Softening Foundations
Pandurangi, Shrinidhi S.
Healey, Timothy J.
Triantafyllidis, Nicolas
Soft Condensed Matter
Transverse wrinkles are known to appear in thin rectangular elastic sheets when stretched in the long direction. Numerically computed bifurcation diagrams for extremely thin, highly stretched films indicate entire orbits of wrinkling solutions, cf. Healey, et. al. [J. Nonlinear Sci., 23 (2013), pp.~777--805]. These correspond to arbitrary phase shifts of the wrinkled pattern in the transverse direction. While such behavior is normally associated with problems in the presence of a continuous symmetry group, an unloaded rectangular sheet possesses only a finite symmetry group. In order to understand this phenomenon, we consider a simpler problem more amenable to analysis -- a finite-length beam on a nonlinear softening foundation under axial compression. We first obtain asymptotic results via amplitude equations, that are valid as a certain non-dimensional beam length becomes sufficiently large. We deduce that any two phase-shifts of a solution differ from one another by exponentially small terms in that length. We validate this observation with numerical computations, indicating the presence of solution orbits for sufficiently long beams. We refer to this as "hidden asymptotic symmetry".
title Hidden Asymptotic Symmetry in Long Elastic Beams on Softening Foundations
topic Soft Condensed Matter
url https://arxiv.org/abs/1903.08775