Bespoke two-dimensional elasticity and the nonlinear analogue of Cauchy’s relations

Abstract: Is it possible to design an architectured material or structure whose elastic energy is arbitrarily close to a specified continuous function? This is known to be possible in one dimension, up to an additive constant (Dixon et al., Bespoke extensional elasticity through helical lattice systems, Proc. R. Soc. A. (2019)). Here, we explore the situation in two dimensions. Given (1) a continuous energy function [Formula: see text], defined for two-dimensional right Cauchy–Green deformation tensors [Formula: see tex… Show more

“…"Bespoke two-dimensional elasticity and the nonlinear analogue of Cauchy's relations" by Chenchiah [10] addresses the question whether it is possible to design a two-dimensional architectured material with the elastic energy arbitrarily close to a specified continuous function.…”

A mathematical mechanics mixed tape: Editor’s foreword to special issue in honor of Alain Goriely

“…"Bespoke two-dimensional elasticity and the nonlinear analogue of Cauchy's relations" by Chenchiah [10] addresses the question whether it is possible to design a two-dimensional architectured material with the elastic energy arbitrarily close to a specified continuous function.…”

A mathematical mechanics mixed tape: Editor’s foreword to special issue in honor of Alain Goriely