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arxiv: 1902.09906 · v1 · pith:IU24ILAJnew · submitted 2019-02-26 · 🧮 math.NA · cs.NA· physics.bio-ph· physics.flu-dyn

The Variational Multiscale Formulation for the Fully-Implicit Log-Morphology Equation as a Tensor-Based Blood Damage Model

classification 🧮 math.NA cs.NAphysics.bio-phphysics.flu-dyn
keywords equationformulationstabilizationstabilizedbloodcompareddamagelog-morph
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We derive a variational multiscale (VMS) finite element formulation for a viscoelastic, tensor-based blood damage model. The tensor equation is numerically stabilized by a logarithmic shape tensor description that prevents unphysical, negative eigenvalues. The resulting VMS stabilization terms for this so-called log-morph equation are presented together with their special numerical treatment. Results for a 2D rotating stirrer test case obtained from log-morph simulations with both SUPG and VMS stabilization show significantly improved numerical behavior if compared with Galerkin/least squares (GLS) stabilized untransformed morphology simulation results. The newly proposed method is also successfully applied to a state-of-the-art centrifugal ventricular assist device (VAD), and clear advantages of the VMS stabilization compared to the SUPG stabilized formulation are presented.

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