# A general constitutive model for dense, fine particle suspensions   validated in many geometries

**Authors:** Aaron Baumgarten, Ken Kamrin

arXiv: 1905.09779 · 2022-06-08

## TL;DR

This paper introduces a comprehensive three-dimensional continuum model for dense, fine particle suspensions that captures complex shear thickening, jamming fronts, and non-Newtonian behaviors across various flow geometries.

## Contribution

It develops a novel, predictive, and general mixture theory-based model with a micro-structural variable, validated against multiple flow scenarios and behaviors.

## Key findings

- Accurately captures shear thickening behaviors (CST and DST).
- Models propagation of shear and impact jamming fronts.
- Represents non-Newtonian effects like 'running on oobleck'.

## Abstract

Fine particle suspensions (such as cornstarch mixed with water) exhibit dramatic changes in viscosity when sheared, producing fascinating behaviors that captivate children and rheologists alike. Recent examination of these mixtures in simple flow geometries suggests inter-granular repulsion is central to this effect --- for mixtures at rest or shearing slowly, repulsion prevents frictional contacts from forming between particles, whereas, when sheared more forcefully, granular stresses overcome the repulsion allowing particles to interact frictionally and form microscopic structures that resist flow. Previous constitutive studies of these mixtures have focused on particular cases, typically limited to two-dimensional, steady, simple shearing flows. In this work, we introduce a predictive and general, three-dimensional continuum model for this material, using mixture theory to couple the fluid and particle phases. Playing a central role in the model, we introduce a micro-structural state variable, whose evolution is deduced from small-scale physical arguments and checked with existing data. Our space- and time-dependent model is implemented numerically in a variety of unsteady, non-uniform flow configurations where it is shown to accurately capture a variety of key behaviors: (i) the continuous shear thickening (CST) and discontinuous shear thickening (DST) behavior observed in steady flows, (ii) the time-dependent propagation of `shear jamming fronts', (iii) the time-dependent propagation of `impact activated jamming fronts', and (iv) the non-Newtonian, `running on oobleck' effect wherein fast locomotors stay afloat while slow ones sink.

## Full text

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## Figures

15 figures with captions in the complete paper: https://tomesphere.com/paper/1905.09779/full.md

## References

42 references — full list in the complete paper: https://tomesphere.com/paper/1905.09779/full.md

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Source: https://tomesphere.com/paper/1905.09779