Oct 28, 2022 · We present an isogeometric approach to compute the inflation of hyperelastic thin shells, following the Kirchhoff-Love hypothesis and associated ...

Jul 17, 2023 · The inflation of hyperelastic thin shells is a highly nonlinear problem that arises in multiple important engineering applications.

Sep 12, 2024 · We present an isogeometric approach to compute the inflation of hyperelastic thin shells, following the Kirchhoff-Love hypothesis and associated ...

Dec 1, 2021 · Bifurcation and postbifurcation of an inflated and extended residually-stressed circular cylindrical tube are analysed.

Computational instability analysis of inflated hyperelastic thin shells ... Computational bifurcation analysis of hyperelastic thin shells. Z Liu, A ...

An eigenvalue analysis of the linear system after each incremental step assesses the possibility of bifurcation to a lower energy mode upon loss of stability.

The accurate prediction of the buckling load of thin shell structures is an important yet elusive goal. It is particularly important in the aerospace ...

Computational instability analysis of inflated hyperelastic thin shells using subdivision surfaces ... shells ... computation of turning and bifurcation points.

Jul 18, 2023 · New preprint - nonlinear deformation and bifurcation of hyperelastic thin shells https://arxiv.org/abs/2210.15854 Generalised Kirchhoff-Love ...

Discrete elastic rods (DER) method provides a computationally efficient means of simulating the nonlinear dynamics of one-dimensional slender structures.