Abstract
This work investigates the morphological stability of a soft body composed of two heavy elastic layers attached to a rigid surface and subjected only to the bulk gravity force. Using theoretical and computational tools, we characterize the selection of different patterns as well as their nonlinear evolution, unveiling the interplay between elastic and geometric effects for their formation. Unlike similar gravity-induced shape transitions in fluids, such as the Rayleigh–Taylor instability, we prove that the nonlinear elastic effects saturate the dynamic instability of the bifurcated solutions, displaying a rich morphological diagram where both digitations and stable wrinkling can emerge. The results of this work provide important guidelines for the design of novel soft systems with tunable shapes, with several applications in engineering sciences.
This article is part of the themed issue ‘Patterning through instabilities in complex media: theory and applications.’
Funder
National Group of Mathematical Physics (GNFM - INdAM) and by MFAG AIRC
Subject
General Physics and Astronomy,General Engineering,General Mathematics
Cited by
19 articles.
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