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Well-posed continuum equations for granular flow with compressibility and μ(I)-rheology.

Authors
  • Barker, T1
  • Schaeffer, D G2
  • Shearer, M3
  • Gray, J M N T1
  • 1 School of Mathematics and Manchester Centre for Nonlinear Dynamics, University of Manchester, Oxford Road, Manchester M13 9PL, UK.
  • 2 Mathematics Department, Duke University, Box 90320, Durham, NC 27708-0320, USA.
  • 3 Department of Mathematics, North Carolina State University, Raleigh, NC 27695-8205, USA.
Type
Published Article
Journal
Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences
Publisher
The Royal Society
Publication Date
May 01, 2017
Volume
473
Issue
2201
Pages
20160846–20160846
Identifiers
DOI: 10.1098/rspa.2016.0846
PMID: 28588402
Source
Medline
Keywords
Language
English
License
Unknown

Abstract

Continuum modelling of granular flow has been plagued with the issue of ill-posed dynamic equations for a long time. Equations for incompressible, two-dimensional flow based on the Coulomb friction law are ill-posed regardless of the deformation, whereas the rate-dependent μ(I)-rheology is ill-posed when the non-dimensional inertial number I is too high or too low. Here, incorporating ideas from critical-state soil mechanics, we derive conditions for well-posedness of partial differential equations that combine compressibility with I-dependent rheology. When the I-dependence comes from a specific friction coefficient μ(I), our results show that, with compressibility, the equations are well-posed for all deformation rates provided that μ(I) satisfies certain minimal, physically natural, inequalities.

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