A 3D morphoelastic rod model with local Stokes hydrodynamics predicts flutter instability and self-sustained 2D or 3D oscillations in clamped elliptic hydrogel filaments under constant axial electric field, with a secondary bifurcation to large-amplitude motions.
Applied Mathematical Sciences
3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
years
2026 3verdicts
UNVERDICTED 3representative citing papers
Global existence of weak solutions is established for one-dimensional quasistatic nonlinear viscoelasticity with Bhattacharya-like viscosity, with solutions characterized as curves of maximal slope and satisfying a metric evolutionary variational inequality under convexity.
A material formulation of the cross-sectional warping problem for hyperelastic beams is derived in Voigt notation to compute effective nonlinear beam stiffness efficiently.
citing papers explorer
-
A three-dimensional morphoelastic model for self-oscillations in polyelectrolyte hydrogel filaments
A 3D morphoelastic rod model with local Stokes hydrodynamics predicts flutter instability and self-sustained 2D or 3D oscillations in clamped elliptic hydrogel filaments under constant axial electric field, with a secondary bifurcation to large-amplitude motions.
-
Gradient-flow characterizations of one-dimensional quasistatic viscoelasticity with Bhattacharya-like viscosity
Global existence of weak solutions is established for one-dimensional quasistatic nonlinear viscoelasticity with Bhattacharya-like viscosity, with solutions characterized as curves of maximal slope and satisfying a metric evolutionary variational inequality under convexity.
-
The cross-sectional warping problem for hyperelastic beams: An efficient formulation in Voigt notation
A material formulation of the cross-sectional warping problem for hyperelastic beams is derived in Voigt notation to compute effective nonlinear beam stiffness efficiently.