Author(s)

Fuzhang Zhao

APD Optima Study, Lake Forest, CA, USA.

An anisotropic continuum stored energy (CSE), which is essentially composed of invariant component groups (ICGs), is postulated to be balanced with its stress work done, constructing a partial differential equation (PDE). The anisotropic CSE PDE is generally solved by the Lie group and the ICGs through curvatures of elasticity tensor are particularly grouped by differential geometry, representing three general deformations: preferred translational deformations, preferred rotational deformations, and preferred powers of ellipsoidal deformations. The anisotropic CSE constitutive models have been curve-fitted for uniaxial tension tests of rabbit abdominal skins and porcine liver tissues, and biaxial tension and triaxial shear tests of human ventricular myocardial tissues. With the newly defined second invariant component, the anisotropic CSE constitutive models capture the transverse effects in uniaxial tension deformations and the shear coupling effects in triaxial shear deformations.

Anisotropic Continuum Stored Energy, Constitutive Modeling, Finite Deformations, Invariant Component Groups, Soft Biological Tissues

Zhao, F. (2018) Anisotropic Continuum Stored Energy Functional Solved by Lie Group and Differential Geometry. Advances in Pure Mathematics, 8, 631-651. doi: 10.4236/apm.2018.87037.