2023
DOI: 10.1002/cnm.3757
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Interpretable data‐driven modeling of hyperelastic membranes

Abstract: We proposed an approach for interpretable data‐driven modeling of an isotropic incompressible hyperelastic membrane deformation. The approach is based on the response functions in terms of the Laplace stretch and the finite element method, where response functions are partial derivatives of a hyperelastic potential with respect to the chosen strain measure. The Laplace stretch as the strain measure allows us to recover directly the response functions from experimental data and construct automatically data‐driv… Show more

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Cited by 2 publications
(5 citation statements)
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“…For the approximate solution of Equation ( 2) we use the hyperelastic nodal force version of the P 1 finite element method [26][27][28]. For the reader's convenience, we briefly review its membrane variant in terms of the Laplace stretch [29]. We consider the deformation of a consistent triangulation of the initial planar configuration Ω 0 .…”
Section: Equilibrium Equations and Finite Element Discretizationmentioning
confidence: 99%
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“…For the approximate solution of Equation ( 2) we use the hyperelastic nodal force version of the P 1 finite element method [26][27][28]. For the reader's convenience, we briefly review its membrane variant in terms of the Laplace stretch [29]. We consider the deformation of a consistent triangulation of the initial planar configuration Ω 0 .…”
Section: Equilibrium Equations and Finite Element Discretizationmentioning
confidence: 99%
“…where ∂ψ/∂ξ s are so-called response functions [8,9]. The other factors ∂ξ s /∂Q i are defined completely by concise formulas [29]. Let the initially flat membrane in flat configuration Ω 0 be deformed so that its current configuration Ω t be defined in the three-dimensional space with basis vectors e 1 , e 2 , e 3 of global (fixed) Cartesian coordinates.…”
Section: Equilibrium Equations and Finite Element Discretizationmentioning
confidence: 99%
See 3 more Smart Citations