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Publication 25-CNA-006
Accretion and Ablation in Deformable Solids using an Eulerian Formulation: A Finite Deformation Numerical Method Kiana Naghibzadeh Anthony D. Rollett Noel J. Walkington Kaushik Dayal This work formulates a method that couples an Eulerian surface growth description to a phase-field approach. It further develops a finite element implementation to solve the model numerically using a fixed computational domain with a fixed discretization. This approach bypasses the challenges that arise in a Lagrangian approach, such as having to construct a four-dimensional reference configuration, remeshing, and/or changing the computational domain over the course of the numerical solution. It also enables the modeling of several settings — such as non-normal growth of biological tissues and stress-induced growth — which can be challenging for available methods. The numerical approach is demonstrated on a model problem that shows non-normal growth, wherein growth occurs by the motion of the surface in a direction that is not parallel to the normal of the surface, that can occur in hard biological tissues such as nails, horns, etc. Next, a thermomechanical model is formulated and used to investigate the kinetics of freezing and melting in ice under complex stress states, particularly to capture regelation which is a key process in frost heave and basal slip in glaciers. Get the paper in its entirety as 25-CNA-006.pdf |
