4.7 Article

A General Return-Mapping Framework for Fractional Visco-Elasto-Plasticity

期刊

FRACTAL AND FRACTIONAL
卷 6, 期 12, 页码 -

出版社

MDPI
DOI: 10.3390/fractalfract6120715

关键词

power-law visco-elasto-plasticity; time-fractional integration; fractional quasi-linear viscoelasticity

资金

  1. ARO YIP Award [W911NF-19-1-0444]
  2. NSF [DMS-1923201]
  3. MURI/ARO Award [W911NF-15-1-0562]
  4. AFOSR YIP Award [FA9550-17-1-0150]
  5. NIH NIDCD [K01DC017751, R21DC020003]

向作者/读者索取更多资源

In this study, a fractional return-mapping framework for power-law visco-elasto-plasticity is developed. Several well-known fractional linear viscoelastic models are constructed using Scott-Blair elements, and combined with a fractional visco-plastic device. The proposed framework is shown to be accurate and computationally efficient through numerical experiments.
We develop a fractional return-mapping framework for power-law visco-elasto-plasticity. In our approach, the fractional viscoelasticity is accounted for through canonical combinations of Scott-Blair elements to construct a series of well-known fractional linear viscoelastic models, such as Kelvin-Voigt, Maxwell, Kelvin-Zener, and Poynting-Thomson. We also consider a fractional quasi-linear version of Fung's model to account for stress/strain nonlinearity. The fractional viscoelastic models are combined with a fractional visco-plastic device, coupled with fractional viscoelastic models involving serial combinations of Scott-Blair elements. We then develop a general return-mapping procedure, which is fully implicit for linear viscoelastic models, and semi-implicit for the quasi-linear case. We find that, in the correction phase, the discrete stress projection and plastic slip have the same form for all the considered models, although with different property and time-step-dependent projection terms. A series of numerical experiments is carried out with analytical and reference solutions to demonstrate the convergence and computational cost of the proposed framework, which is shown to be at least first-order accurate for general loading conditions. Our numerical results demonstrate that the developed framework is more flexible and preserves the numerical accuracy of existing approaches while being more computationally tractable in the visco-plastic range due to a reduction of 50% in CPU time. Our formulation is especially suited for emerging applications of fractional calculus in bio-tissues that present the hallmark of multiple viscoelastic power-laws coupled with visco-plasticity.

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