Numerical simulation of clarifier-thickener units treating ideal suspensions with a flux density function having two inflection points

We consider a nonconvex conservation law modelling the settling of particles in ideal clarifier-thickener units. The flux function of this conservation law has an explicit spatial dependence that is discontinuous. Previous works by two of the authors, together with collaborators, have been aimed at providing a firm rigorous ground of mathematical (global existence and uniqueness) and numerical analysis for clarifier-thickener models. Although the results of these works are briefly summarized herein, the chief goal of this paper is to present a number of numerical simulations of practical interest and to draw some conclusions from them. In contrast to previous papers we consider here flux density functions with two inflection points, which result in solutions exhibiting a richer structure than for flux density functions having one inflection point. The relevance of the ''two inflection point'' case comes from experimental observations. In addition, we include here several numerical simulations in which the feed rate and overflow and underflow bulk rates vary with time. Time dependent situations have high practical value, but have been very little studied in the literature.

[1]  Raimund Bürger,et al.  A Model of Continuous Sedimentation of Flocculated Suspensions in Clarifier-Thickener Units , 2005, SIAM J. Appl. Math..

[2]  N. Risebro,et al.  Solution of the Cauchy problem for a conservation law with a discontinuous flux function , 1992 .

[3]  Christian Klingenberg,et al.  A front tracking approach to a model of continuous sedimentation in ideal clarifier-thickener units , 2003 .

[4]  John D. Towers,et al.  Well-posedness in BVt and convergence of a difference scheme for continuous sedimentation in ideal clarifier-thickener units , 2004, Numerische Mathematik.

[5]  Wolfgang L. Wendland,et al.  Entropy Boundary Conditions in the Theory of Sedimentation of Ideal Suspensions , 1996 .

[6]  C. Petty,et al.  Continuous sedimentation of a suspension with a nonconvex flux law , 1975 .

[7]  Raimund Bürger,et al.  Central schemes and systems of conservation laws with discontinuous coefficients modeling gravity separation of polydisperse suspensions , 2004 .

[8]  Raimund Bürger,et al.  Applications of the phenomenological theory to several published experimental cases of sedimentation processes , 2000 .

[9]  E. W. Comings THICKENING CALCIUM CARBONATE SLURRIES , 1940 .

[10]  Kenneth H. Karlsen,et al.  A relaxation scheme for conservation laws with a discontinuous coefficient , 2003, Math. Comput..

[11]  Stefan Diehl,et al.  A conservation Law with Point Source and Discontinuous Flux Function Modelling Continuous Sedimentation , 1996, SIAM J. Appl. Math..

[12]  Jérôme Jaffré,et al.  Godunov-Type Methods for Conservation Laws with a Flux Function Discontinuous in Space , 2004, SIAM J. Numer. Anal..

[13]  S. Kružkov FIRST ORDER QUASILINEAR EQUATIONS IN SEVERAL INDEPENDENT VARIABLES , 1970 .

[14]  J. Nédélec,et al.  First order quasilinear equations with boundary conditions , 1979 .

[15]  W. J. Glantschnig,et al.  Settling suspensions of colloidal silica: observations and X-ray measurements , 1991 .

[16]  R. Dick,et al.  Evaluation of Activated Sludge Thickening Theories , 1967 .

[17]  H. Holden,et al.  Front Tracking for Hyperbolic Conservation Laws , 2002 .

[18]  Christian Klingenberg,et al.  Convex conservation laws with discontinuous coefficients. existence, uniqueness and asymptotic behavior , 1995 .

[19]  Raimund Bürger,et al.  Numerical methods for the simulation of continuous sedimentation in ideal clarifier-thickener units , 2004 .

[20]  P. Scales,et al.  Estimation of the hindered settling function R(ϕ) from batch‐settling tests , 2005 .

[21]  S. Osher,et al.  Stable and entropy satisfying approximations for transonic flow calculations , 1980 .

[22]  R. Font,et al.  Analysis of the Variation of the Upper Discontinuity in Sedimentation Batch Test , 1998 .

[23]  N. G. Barton,et al.  Control of a surface of discontinuity in continuous thickness , 1992, The Journal of the Australian Mathematical Society. Series B. Applied Mathematics.

[24]  P. T. Shannon,et al.  Batch and Continuous Thickening. Basic Theory. Solids Flux for Rigid Spheres , 1963 .

[25]  Raimund Bürger,et al.  Mathematical model and numerical simulation of the dynamics of flocculated suspensions in clarifier–thickeners , 2005 .

[26]  K. Karlsen,et al.  A mathematical model for batch and continuous thickening of flocculated suspensions in vessels with varying cross-section , 2004 .

[27]  K. Simic,et al.  Consolidation and aggregate densification during gravity thickening , 2000 .

[28]  Stefan Diehl,et al.  Operating charts for continuous sedimentation I: Control of steady states , 2001 .

[29]  Naoya Yoshioka,et al.  Continuous Thickening of Homogeneous Flocculated Slurries , 1957 .

[30]  Raimund Bürger,et al.  Sedimentation and suspension flows: Historical perspective and some recent developments , 2001 .

[31]  Wolfgang L. Wendland,et al.  Control of continuous sedimentation of ideal suspensions as an initial and boundary value problem , 1990 .

[32]  R. Bürger,et al.  Settling velocities of particulate systems: 11. Comparison of the phenomenological sedimentation–consolidation model with published experimental results , 1999 .

[33]  John D. Towers,et al.  L¹ STABILITY FOR ENTROPY SOLUTIONS OF NONLINEAR DEGENERATE PARABOLIC CONVECTION-DIFFUSION EQUATIONS WITH DISCONTINUOUS COEFFICIENTS , 2003 .

[34]  Raimund Bürger,et al.  A relaxation scheme forcontinuous sedimentation in ideal clarifier-thickener units , 2005 .

[35]  E. W. Comings,et al.  Continuous Settling and Thickening , 1954 .

[36]  D. Drew,et al.  Theory of Multicomponent Fluids , 1998 .

[37]  Yu-Sin Jang,et al.  Non-colloidal sedimentation compared with Kynch theory , 1997 .

[38]  Siam Staff,et al.  Godunov-Type Methods for Conservation Laws with a Flux Function Discontinuous in Space , 2004 .

[39]  Raimund Bürger,et al.  On a Model for Continuous Sedimentation in Vessels with Discontinuous Cross-sectional Area , 2003 .

[40]  John D. Towers A Difference Scheme for Conservation Laws with a Discontinuous Flux: The Nonconvex Case , 2001, SIAM J. Numer. Anal..

[41]  Nicolas Seguin,et al.  ANALYSIS AND APPROXIMATION OF A SCALAR CONSERVATION LAW WITH A FLUX FUNCTION WITH DISCONTINUOUS COEFFICIENTS , 2003 .

[42]  Raimund Bürger,et al.  Monotone difference approximations for the simulation of clarifier-thickener units , 2004 .

[43]  W. Talmage,et al.  Determining Thickener Unit Areas , 1955 .

[44]  Morton M. Denn,et al.  Dynamics and control of the activated sludge wastewater process , 1978 .

[45]  Stefan Diehl,et al.  On scalar conservation laws with point source and discontinuous flux function , 1995 .

[46]  Raimund Bürger,et al.  Settling velocities of particulate systems: 14. Unified model of sedimentation, centrifugation and filtration of flocculated suspensions , 2003 .

[47]  Stefan Diehl,et al.  On boundary conditions and solutions for ideal clarifier–thickener units , 2000 .

[48]  John D. Towers,et al.  Upwind difference approximations for degenerate parabolic convection–diffusion equations with a discontinuous coefficient , 2002 .

[49]  Elmer Melvin Tory BATCH AND CONTINUOUS THICKENING OF SLURRIES , 1961 .

[50]  Raimund Bürger,et al.  Strongly Degenerate Parabolic-Hyperbolic Systems Modeling Polydisperse Sedimentation with Compression , 2003, SIAM J. Appl. Math..

[51]  K. J. Scott Experimental Study of Continuous Thickening of a Flocculated Silica Slurry , 1968 .

[52]  P. Floch,et al.  Boundary conditions for nonlinear hyperbolic systems of conservation laws , 1988 .

[53]  Wolfgang L. Wendland,et al.  Global weak solutions to the problem of continuous sedimentation of an ideal suspension , 1990 .

[54]  Stefan Diehl Dynamic and Steady-State Behavior of Continuous Sedimentation , 1997, SIAM J. Appl. Math..

[55]  Raimund Bürger,et al.  Sedimentation and Thickening , 1999 .

[56]  John D. Towers Convergence of a Difference Scheme for Conservation Laws with a Discontinuous Flux , 2000, SIAM J. Numer. Anal..

[57]  Raimund Bürger,et al.  On upper rarefaction waves in batch settling , 2000 .

[58]  Christian Klingenberg,et al.  Stability of a Resonant System of Conservation Laws Modeling Polymer Flow with Gravitation , 2001 .

[59]  A. Michaels,et al.  Settling Rates and Sediment Volumes of Flocculated Kaolin Suspensions , 1962 .

[60]  G. J. Kynch A theory of sedimentation , 1952 .