Topological sensitivity analysis for a two-parameter Mooney-Rivlin hyperelastic constitutive model
AUTOR(ES)
Pereira, Carlos E. L., Bittencourt, Marco L.
FONTE
Latin American Journal of Solids and Structures
DATA DE PUBLICAÇÃO
2010
RESUMO
The Topological Sensitivity Analysis (TSA) is represented by a scalar function, called Topological Derivative (TD), that gives for each point of the domain the sensitivity of a given cost function when an infinitesimal hole is created. Applications to the Laplace, Poisson, Helmoltz, Navier, Stokes and Navier-Stokes equations can be found in the literature. In the present work, an approximated TD expression applied to nonlinear hyperelasticity using the two parameter Mooney-Rivlin constitutive model is obtained by a numerical asymptotic analysis. The cost function is the total potential energy functional. The weak form of state equation is the constraint and the total Lagrangian formulation used. Numerical results of the presented approach are considered for hyperelastic plane problems.
Documentos Relacionados
- Predicting the dynamic material constants of Mooney-Rivlin model in broad frequency range for elastomeric components
- Deflection profile analysis of beams on two-parameter elastic subgrade
- Two-parameter analysis of the temporal behaviour of resistive detectors
- Two-parameter Rigid Block Approach to Upper Bound Analysis of Equal Channel Angular Extrusion Through a Segal 2θ-die
- A two-parameter framework to describe effects of constraint loss on cleavage fracture and implications for failure assessments of cracked components
