A Corrected Sadowsky Functional for Inextensible Elastic Ribbons

Abstract: In this work, we make a distinction between the differential geometric notion of an isometry relationship among two dimensional surfaces embedded in three-dimensional point space and the continuum mechanical notion of an isometric deformation of a two dimensional material surface. We illustrate the importance of separating the abstract theory of surfaces in differential geometry and their related differential geometric features from the physical notion of a material surface which is subject to a deformation fr… Show more

“…It incorporates into its definition the non-linear constraint (1.1) that appears into the two-dimensional model (CvK) ε . The energy density Q agrees with the corrected Sadowsky energy density found in [9] in the isotropic case, and with that found in [10] for the general anisotropic case. To the best of our knowledge, the model (CvK) is new.…”

One-dimensional von Kármán models for elastic ribbons

“…It incorporates into its definition the non-linear constraint (1.1) that appears into the two-dimensional model (CvK) ε . The energy density Q agrees with the corrected Sadowsky energy density found in [9] in the isotropic case, and with that found in [10] for the general anisotropic case. To the best of our knowledge, the model (CvK) is new.…”

One-dimensional von Kármán models for elastic ribbons

“…An adaptation of the theoretical results of [17] allows to prove in [6] a compactness result for sequences {u ε } such that E ε (u ε ) is uniformly bounded, and a Γ-convergence result for the functionals E ε . We gather in Theorem 2.3 below the most important consequences of these results.…”

“…Building upon our recent work [3,6], which has been in turn inspired by [17,18,24], we discuss in this paper the derivation of models capable of describing non-trivial shapes that can be spontaneously exhibited by thin sheets of nematic elastomers. In particular, we focus on the twist director geometry, and we present a derivation of reduced models for wide and narrow ribbons (namely, rods whose cross-section is a thin rectangle) by following a sequential dimension reduction technique, namely, a 3D→2D→1D procedure, see Section 2.…”

Dimension reduction via $$\Gamma $$ Γ -convergence for soft active materials

“…The class of functionals with this property may be wider. However, it does not include the corrected Sadowsky functional constructed in [8] (although this correction only affects solutions where |η| > 1, so solutions for which |η| ≤ 1 everywhere are still spherical). Nor does it include the narrow limit (w → 0) of the functional for annular strips derived in [6], nor, seemingly, the functional for narrow residually-stressed strips derived in [7].…”

Forceless Sadowsky strips are spherical