A Discontinuous Galerkin and Semismooth Newton Approach for the Numerical Solution of the Nonhomogeneous Bingham Flow

This paper is devoted to the study of non-homogeneous Bingham flows. We introduce a second-order, divergence-conforming discretization for the Bingham constitutive equations, coupled with a discontinuous Galerkin scheme for the mass density. One of the main challenges when analyzing viscoplastic materials is the treatment of the yield stress. In order to overcome this issue, in this work we propose a local regularization, based on a Huber smoothing step. We also take advantage of the properties of the divergence conforming and discontinuous Galerkin formulations to incorporate upwind discretizations to stabilize the formulation. The stability of the continuous problem and the full-discrete scheme are analyzed. Further, a semismooth Newton method is proposed for solving the obtained fully-discretized system of equations at each time step. Finally, several numerical examples that illustrate the main features of the problem and the properties of the numerical scheme are presented.

[1]  Gert Lube,et al.  Divergence-Free H(div)-FEM for Time-Dependent Incompressible Flows with Applications to High Reynolds Number Vortex Dynamics , 2017, Journal of Scientific Computing.

[2]  G. Burton Sobolev Spaces , 2013 .

[3]  F. Thomasset Finite element methods for Navier-Stokes equations , 1980 .

[4]  Chun Liu,et al.  Convergence of Numerical Approximations of the Incompressible Navier-Stokes Equations with Variable Density and Viscosity , 2007, SIAM J. Numer. Anal..

[5]  G. G. Stokes "J." , 1890, The New Yale Book of Quotations.

[6]  Ohannes A. Karakashian,et al.  A Nonconforming Finite Element Method for the Stationary Navier--Stokes Equations , 1998 .

[7]  Emmanuel Creusé,et al.  An hybrid finite volume-finite element method for variable density incompressible flows , 2008, J. Comput. Phys..

[8]  Rolf Stenberg,et al.  H(div)-conforming Finite Elements for the Brinkman Problem , 2011 .

[9]  R. Temam,et al.  Navier-Stokes equations: theory and numerical analysis: R. Teman North-Holland, Amsterdam and New York. 1977. 454 pp. US $45.00 , 1978 .

[10]  L. Quartapelle,et al.  A projection FEM for variable density incompressible flows , 2000 .

[11]  On a nonhomogeneous Bingham fluid , 1985 .

[12]  N. Inogamov,et al.  Rayleigh–Taylor instability in a visco-plastic fluid , 2010 .

[13]  L. D. Marini,et al.  Two families of mixed finite elements for second order elliptic problems , 1985 .

[14]  Jie Shen,et al.  Gauge-Uzawa methods for incompressible flows with variable density , 2007, J. Comput. Phys..

[15]  Abner J. Salgado,et al.  A splitting method for incompressible flows with variable density based on a pressure Poisson equation , 2009, J. Comput. Phys..

[16]  Nonhomogeneous incompressible Bingham viscoplastic as a limit of nonlinear fluids , 2007 .

[17]  P. Poncet,et al.  A parametric study of mucociliary transport by numerical simulations of 3D non-homogeneous mucus. , 2016, Journal of biomechanics.

[18]  Guido Kanschat,et al.  A locally conservative LDG method for the incompressible Navier-Stokes equations , 2004, Math. Comput..

[19]  A. Doludenko On contact instabilities of viscoplastic fluids in two-dimensional setting , 2017 .

[20]  Raphaël Danchin,et al.  Local and global well-posedness results for flows of inhomogeneous viscous fluids , 2004, Advances in Differential Equations.

[21]  V. Bertola,et al.  Morphology of viscoplastic drop impact on viscoplastic surfaces. , 2017, Soft matter.

[22]  A. Ern,et al.  Mathematical Aspects of Discontinuous Galerkin Methods , 2011 .

[23]  S. G. Andrade,et al.  A combined BDF-semismooth Newton approach for time-dependent Bingham flow , 2012 .

[24]  Vivette Girault,et al.  Finite Element Methods for Navier-Stokes Equations - Theory and Algorithms , 1986, Springer Series in Computational Mathematics.

[25]  Douglas N. Arnold,et al.  Unified Analysis of Discontinuous Galerkin Methods for Elliptic Problems , 2001, SIAM J. Numer. Anal..

[26]  Claude Bardos,et al.  Mathematical Topics in Fluid Mechanics, Volume 1, Incompressible Models , 1998 .

[27]  Mary F. Wheeler,et al.  A discontinuous Galerkin method with nonoverlapping domain decomposition for the Stokes and Navier-Stokes problems , 2004, Math. Comput..

[28]  Hantaek Bae Navier-Stokes equations , 1992 .

[29]  Jean-Luc Guermond,et al.  Approximation of variable density incompressible flows by means of finite elements and finite volumes , 2001 .

[30]  Patrick Hild,et al.  The blocking of an inhomogeneous Bingham fluid.Applications to landslides , 2002 .

[31]  Roger I. Tanner,et al.  Numerical analysis of three-dimensional Bingham plastic flow , 1992 .

[32]  G. Tryggvason Numerical simulations of the Rayleigh-Taylor instability , 1988 .

[33]  O. Hungr Analysis of debris flow surges using the theory of uniformly progressive flow , 2000 .