1. Nonlocal damage theory in hybrid-displacement formulations
- Author
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Luís M. S. S. Castro and Cristina Matos Silva
- Subjects
Basis (linear algebra) ,Heaviside step function ,Mechanical Engineering ,Applied Mathematics ,Mathematical analysis ,Linear elasticity ,Infinitesimal strain theory ,Condensed Matter Physics ,Finite element method ,Displacement (vector) ,symbols.namesake ,Trefftz functions ,Hybrid-displacement formulations ,Materials Science(all) ,Mechanics of Materials ,Modeling and Simulation ,Modelling and Simulation ,Nonlocal damage models ,symbols ,Legendre polynomials ,General Materials Science ,Orthonormal basis ,Mathematics - Abstract
This paper discusses three hybrid-displacement finite element formulations for the simulation of strain localization based on nonlocal damage theory. An isotropic integral nonlocal damage model is chosen. The hybrid finite element formulations adopted in this work are developed from first principles of Mechanics. The first one defines the domain approximations using the Trefftz functions derived for the linear elastic regime. When damage appears the hybrid-Trefftz displacement formulation degenerates into an hybrid-displacement formulation. The second formulation uses an enriched Trefftz basis with the consideration of local Heaviside functions. The third formulation uses orthonormal Legendre polynomials for the domain approximations. A set of benchmark tests is presented and discussed in order to compare the performance and accuracy of the different models. It is shown that the proposed hybrid-Trefftz formulation allows the reproduction of the general behavior of the structure but does not lead to a correct simulation of the strain tensor evolution. The hybrid-displacement formulation that uses orthonormal Legendre polynomials gives coherent results, so it appears to be a promising field of investigation.
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