Asymptotic variational analysis of incompressible elastic strings

TL;DR

This paper derives one-dimensional models for incompressible elastic strings from three-dimensional nonlinear elasticity using $$-convergence, accounting for different force scalings and local volume preservation constraints.

Contribution

It provides explicit limit energies for incompressible strings via $$-convergence analysis, addressing nonlinear constraints and various force regimes.

Findings

Explicit one-dimensional limit energies depending on force scaling.

Incompressibility constraints influence energy densities and admissible deformations.

Recovery sequences are constructed to satisfy nonlinear differential constraints.

Abstract

Starting from three-dimensional nonlinear elasticity under the restriction of incompressibility, we derive reduced models to capture the behavior of strings in response to external forces. Our $\Gamma$-convergence analysis of the constrained energy functionals in the limit of shrinking cross sections gives rise to explicit one-dimensional limit energies. The latter depend on the scaling of the applied forces. The effect of local volume preservation is reflected either in their energy densities through a constrained minimization over the cross-section variables or in the class of admissible deformations. Interestingly, all scaling regimes allow for compression and/or stretching of the string. The main difficulty in the proof of the $\Gamma$-limit is to establish recovery sequences that accommodate the nonlinear differential constraint imposed by the incompressibility. To this end, we modify classical constructions in the unconstrained case with the help of an inner perturbation argument tailored for $3$d-$1$d dimension reduction problems.