[專題演講] 【7月21日】Isaac Vikram Chenchiah / Bespoke Elasticity and the Nonlinear Analogue of Cauchy’s Relations

by 沈希諴 | 2025-06-05 14:24:11

Time/Date: TBA / July 21, 2025

Venue: M212, Mathematics Building, Gongguan Campus[1], NTNU

Speaker: Isaac Vikram Chenchiah, Associate Professor, School of Mathematics, University of Bristol (UK)

Title:  Bespoke 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 possible in one dimension, up to an additive constant [Dixon et al. (2019) https://doi.org/10.1098/rspa.2019.0547[2]]. After a review of that result, we explore the situation in two dimensions: Given (i) a continuous energy function E(C), defined for two-dimensional right Cauchy–Green deformation tensors C contained in some compact set, and (ii) a tolerance ϵ > 0, can we construct a spring-node unit cell (of a lattice) whose energy is approximately E, up to an additive constant, with L∞ -error no more than ϵ? We show that the answer is yes for affine Es (i.e., for energies E that are quadratic in the deformation gradient) but that the general situation is more subtle and is related to the generalisation of Cauchy’s relations to nonlinear elasticity.

Ref: Chenchiah IV. Bespoke two-dimensional elasticity and the nonlinear analogue of Cauchy’s relations (2024) https://doi.org/10.1177/10812865231198204[3]

Endnotes:
  1. Gongguan Campus: https://en.ntnu.edu.tw/gongguan-campus.php#tab-1
  2. https://doi.org/10.1098/rspa.2019.0547: https://royalsocietypublishing.org/doi/10.1098/rspa.2019.0547
  3. https://doi.org/10.1177/10812865231198204: https://doi.org/10.1177/10812865231198204

Source URL: https://cantor.math.ntnu.edu.tw/index.php/2025/06/05/20250721talk/