Constitutive Equations for Hyperelastic Materials Based on the Upper Triangular Decomposition of the Deformation Gradient
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Publication:5244341
DOI10.1177/1081286518806950zbMath1425.74082OpenAlexW2905923556MaRDI QIDQ5244341
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Publication date: 20 November 2019
Published in: Mathematics and Mechanics of Solids (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1177/1081286518806950
rotationhyperelastic materialsimple sheardeformation gradientpolar decompositionconstitutive equationdistortion tensorstretchstrain energy density function
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Cites Work
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- Kinematics and elasticity framework for materials with two fiber families
- Mechanical response of neo-Hookean fiber-reinforced incompressible nonlinearly elastic solids
- Mechanical response of fiber-reinforced incompressible non-linearly elastic solids
- Mechanics of composites with two families of finitely extensible fibers undergoing large deformations
- A new constitutive theory for fiber-reinforced incompressible nonlinearly elastic solids
- Concerning the polar decomposition of the deformation gradient
- Finite element implementation of incompressible, transversely isotropic hyperelasticity
- On the independence of strain invariants of two preferred direction nonlinear elasticity
- On the spectral constitutive modelling of transversely isotropic soft tissue: physical invariants
- The upper triangular decomposition of the deformation gradient: possible decompositions of the distortion tensor
- On the use of the upper triangular (or QR) decomposition for developing constitutive equations for Green-elastic materials
- Transversely isotropic biological, soft tissue must be modelled using both anisotropic invariants
- Invariant formulation of hyperelastic transverse isotropy based on polyconvex free energy functions.
- Hyperelastic energy densities for soft biological tissues: a review
- Physically motivated invariant formulation for transversely isotropic hyperelasticity
- On the determination of deformation from strain
- A polyconvex framework for soft biological tissues. Adjustment to experimental data
- Neo-Hookean fiber-reinforced composites in finite elasticity
- A composites-based hyperelastic constitutive model for soft tissue with application to the human annulus fibrosus
- Continuum-mechanical modelling of kink-band formation in fibre-reinforced composites
- Physically based invariants for nonlinear elastic orthotropic solids
- Nonlinear Elasticity
- Invariants of the Stretch Tensors and their Application to Finite Elasticity Theory
- Review Paper: Continuum biomechanics of soft biological tissues
- A transversely isotropic visco-hyperelastic constitutive model for soft tissues
- Physically based strain invariant set for materials exhibiting transversely isotropic behavior
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