Open access peer-reviewed chapter

CFD Analysis of Turbulence Models to Achieve the Digester Mixing Process

Written By

Jorge Flores-Velazquez, Abraham Jesus Arzeta-Rios, Waldo Ojeda Bustamante and Teodoro Espinosa-Solares

Submitted: 07 April 2017 Reviewed: 02 November 2017 Published: 20 December 2017

DOI: 10.5772/intechopen.72171

From the Edited Volume

Computational Fluid Dynamics - Basic Instruments and Applications in Science

Edited by Adela Ionescu

Chapter metrics overview

1,571 Chapter Downloads

View Full Metrics

Abstract

Mixing efficiency defines the features of physicochemical and biological reactions carried out in reactors or digesters. The reason for this influence is because it conditions the heat and mass transfer. That is why the mixing level and intensity become important aspects to study to know the effects they have on the processes. Furthermore, it should be noted that most of the mixing processes are carried out under turbulent conditions. Mixing enhancement evaluation is achieved in two ways, that is, experimentally and performing simulations. Simulations are based on numerical methods approximating solutions to results in line with reality. In this context, turbulence models applied in systems have great influence on the final numerical solution and, therefore, on the interpretation of improved mixing in reactors. It is also necessary to consider the influence of rheology in these simulations, since the working fluid does not always have a linear stress-strain relationship. In this way, an analysis of turbulence models and their applications in mixing characterization and the adequacy of these models to the reactor configuration and operating conditions is carried out. Mention is also made of the experiences around the study of turbulence in mixing tanks.

Keywords

  • turbulence models
  • mixing
  • digester
  • rheology
  • dead zones

1. Introduction

The use of biodigesters offers great advantages in energy production. The purpose of anaerobic digestion (AD) is the destruction of volatile solids by microorganisms in the absence of oxygen [1]. The AD is a common process to stabilize and reduce excesses or wastes of a different nature. For example, in a wastewater treatment plant and agricultural holdings, the AD allows a better treatment of animal or vegetable waste, by extracting much of the energy they contain. Besides, the use of biogas to generate electricity gives an additional value to the utilization of bioreactors in agricultural enterprises. The process of anaerobic digestion has several implications, and its effectiveness is based on aspects such as source, pH, temperature, reduction potential, hydraulic retention time (HRT) and mixing characteristics [2].

Mixing is one of the critical activities in the transformation process, a uniform mixture reduces the stratification, allows a better substrate dispersion, and if the mixture is not adequate, the digestion efficiency is reduced [3, 4]. When designing an anaerobic digestion system, the volume to be removed should be considered in relation to pump capacity, hydraulic retention time, sludge inflow rate, velocity gradient which relates the pump power, tank volume and sludge viscosity [1, 5].

Despite the technological advances in organic waste treatment, established mechanisms for design and operation require even more research. The AD is based on a combination of complex processes in which different residues are transformed mainly into a mixture composed of CH4, CO2 and H2, which is called biogas [6].

Hydrodynamic performance of bioreactors is determined by the flow patterns inside. Consequently, biogas production is also conditioned by the reactor design, mainly referred to device dimensions and arrangement inside to favor the fluid movement and thereby generate the desired product [7]. Several models that allow relatively stable operation and provide desirable results have emerged. However, the punctual analysis of fluid movement inside the bioreactor is a complex issue mainly for the fluid characteristics, and of course by the geometry. This problem has been investigated using numerical methods, specifically computational fluid dynamics (CFD).

Digester design process involves several stages. A part is based on the calculation of organic loading rate as a function of temperature and input intensity. However, factors such as sedimentation, biogas, and sludge accumulation can influence on system hydrodynamic behavior and therefore on its removal efficiency. Generally, the predominance of mixed flows inside the reactor and its highly complex description is presumed, reason why a numerical discretization is attempted using CFD.

The evaluation and optimization of designs currently made with CFD allows to reduce the costs of prototype development [8]. Different studies have been conducted on improving hydrodynamic configurations using CFD [9, 10]. The use of CFD has allowed to understand that mixing is one of the most important activities for total solids reduction and biogas production. Despite the low speeds occurring inside a biodigester, it is advisable that the materials be completely mixed, so it is desirable to produce turbulence, which will be a function of rheological characteristics of fluid, flow rate, and dimensions and geometry of bioreactor.

Phenomena involving fluid movement at high velocities or in chaotic patterns can be inferred by turbulence models. Currently, robust turbulence models applicable to most physical processes have been developed. This is shown by the comparison of numerical solutions against experimental results.

With the addition of rheological properties of reaction materials, an appropriate turbulence model application for simulation becomes more complicated, since it is usual to find materials that do not present linear stress-strain behavior when flowing, that is, non-Newtonian fluids [11].

Advertisement

2. Factors affecting mixing

2.1. Geometric characteristics of containers

Flow dynamics of mixing process in anaerobic digesters has been analyzed from different standpoints. In waste degradation for energy generation, there are advances indicating the relevance of mixing process. Although good mixing can favor the material homogenization and exchange process between microorganisms and their environment, excessive mixing may also disrupt biological activities such as trophic processes [12, 13].

Studies on geometry influence in the mixing process include not only the container shape but also the shape of elements to generate movement inside the reactors. Agitation inside the anaerobic digestion containers is carried out mainly in the following three ways: (1) mechanical agitation with impellers, (2) pumped circulation and (3) gas recirculation [4].

The main type of reactor used in anaerobic digestion is the Continuous Stirred Tank Reactor (CSTR), from which various geometry investigations have been carried out, of flat bottom, conical, spherical or even egg-shaped reactors [14, 15]. The scale of the process is also a factor to be considered in the hydrodynamic performance of bioreactors, since there may be differences in performance when moving from a laboratory scale (Figure 1) to a full scale.

Figure 1.

Laboratory-scale anaerobic reactor with pumped circulation.

Large-scale agricultural waste treatment is commonly performed in covered lagoon digesters (Figure 2), which are reservoirs with a gas-tight cover mounted for biogas capture [10, 16]. Such reactors are used to exploit the methane production potential of animal waste. In these reactors, methane emission rates may vary depending on the covered lagoon area [17].

Figure 2.

Covered lagoon digesters for cow manure treatment.

2.2. Fluid rheology

Total solids concentration in digestion fluids, besides having effects on degradation rate of organic matter, also has direct effects on rheological properties [14]. The study of fluid rheology entails the adjustment of CFD models to more real conditions [18, 19].

Rheological behavior of fluids can be described by a basic diagram of shear rate against shear stress (Figure 3). The time-independent flow behavior is classified as Newtonian and non-Newtonian (shear thinning, shear thickening and yield stress) [11]. The rheological properties of non-Newtonian fluids greatly affect flow patterns, differing from those obtained with Newtonian fluids [19].

Figure 3.

Shear rate versus shear stress for non-Newtonian fluids.

The description of nonlinear deformation of non-Newtonian fluids is characterized by generating rheological models, which must match experimental data that help obtain the value of model variables to be used. The rheological model application will depend on behavior and trend of experimental data, as well as the speed ranges achieved by the mixing equipment.

2.2.1. Power law model in rheology

The power law model (Eq. (1)) has been employed to adjust experimental data and to describe the rheological behavior of anaerobic digestion fluids [19].

η=kγ̇n1E1

where η is viscosity, k is consistency coefficient, γ̇ is shear rate and n is power law index.

Commercial CFD programs incorporate the power law model function for viscosity of non-Newtonian fluids. This model only fits to shear thinning region (Figure 4).

Figure 4.

Flow curve of 4% cow manure and power law model fit to experimental data.

2.2.2. Herschel-Bulkley model

The capacities of the Herschel-Bulkley model (Eq. (2)) to show the sludge behavior before the flow occurs (very low shear stress) and when it begins to flow (shear stresses that exceed yield) make these yield stress models preferable in anaerobic digestion applications [20].

τ=τy+kγ̇nE2

where τ is shear stress, τy is yield stress, γ̇ is shear rate, k and n are model factors.

2.2.3. Cross and Carreau viscosity models

The Cross (Eq. (3)) and Carreau (Eq. (4)) models are suitable to describe the shear dependence of aqueous dispersions [11].

η=η+η0η1+Kγ̇nE3
η=η+η0η1+λγ̇2NE4

where η is non-Newtonian viscosity, η is viscosity in the lower Newtonian region, η0 is viscosity in the upper Newtonian region, K and λ are time constants related to the relaxation times and n and N are dimensionless exponents.

These models have been employed to describe the flow curve of anaerobic sludge and model fluids with similar characteristics [21]. Although some commercial CFD packages have included rheological model functions, some authors have preferred to use user-defined functions (UDF) to incorporate them.

2.2.4. Use of model fluids

Fluid dynamics validations in anaerobic reactors usually use model fluids, which have rheological characteristics like digestion fluids, with the advantage of being translucent to allow the application of optical techniques for fluid movement visualization.

Xanthan gum solutions are non-Newtonian fluids that exhibit similar properties to various media used in anaerobic digestion [22]. The use of rheometers for determination of flow curves (Figure 5) is essential when determining the upper and lower Newtonian plateaus.

Figure 5.

Flow curve of 0.05% xanthan gum solution and Cross viscosity model equation.

Advertisement

3. Turbulence models applied in characterization of mixing in bioreactors

Flow velocity, characteristic length and fluid properties are, among others, factors that define the flow type. Differences between the dynamic and kinematic viscosities can cause a turbulent flow, which in turn leads to the appearance of eddies whose description allows to infer mixing processes; however, due to the wide range of length and time scales that interact with each other, dynamic analysis is complex [23].

Turbulent flows are numerically simulated using methods such as Reynolds Average Navier-Stokes (RANS), Direct Numerical Simulation (DNS) and Large Eddy Simulation (LES). Although the most accurate method is DNS, it has the disadvantage of being computationally more expensive. The RANS simulation method is the most used in turbulent flow simulations in bioreactors; however, another method that could be appropriate to model the turbulent mixing in bioreactors is the embedded LES [4].

In CFD applications, the effectiveness of several turbulence models has been evaluated to mixing characterization of non-Newtonian fluids in anaerobic digesters, such as the standard k-ε model, RNG k-ε model, realizable k-ε model, standard k-ω model, SST k-ω model and the Reynolds Stress Model [8, 24].

3.1. k-ε turbulence models

The k-ε turbulence model is widely used in commercial CFD programs. This model has been tested under different flow conditions and is numerically robust and computationally less expensive [25]. Applications include studies on mixing performance improvement in CSTR used in anaerobic digestion [26, 27]. The transport equations of the model are shown as follows [28]:

tρk+xiρkui=xjµ+µtσkkxj+Gk+GbρεE5
tρε+xiρϵui=xjµ+µtσεεxj+C1εεkGk+C3εGbC2ερε2kE6

where ρ is liquid density, t is time, u is velocity, μ is viscosity, μt is turbulent viscosity, k and ε are turbulent kinetic energy and specific dissipation rate respectively, σkandσε are turbulent Prandtl numbers, Gk represent the turbulent kinetic energy generation due to mean velocity gradients, Gb is turbulent kinetic energy generation due to buoyancy, C1ε, C2ε and C3ε are constants.

3.2. k-ω turbulence models

The k-ω model has been applied to predict flow characteristics during the mixing of anaerobic sludge [8, 24]. This model is recommended when modeling the flow of non-Newtonian fluids to low Reynolds numbers [29]. The governing equations for turbulent kinetic energy and the specific rate of dissipation are as follows [30]:

tρk+xjρujk=ρτijuixjβρkω+xjµ+σρkωkxjE7
tρω+xjρujω=αωkρτijuixjβρω2+σdρωkxjωxj+xjµ+σρkωωxjE8

where p is static pressure, τij is the Reynolds stress tensor, βandσ are body forces and k and ω are turbulent kinetic energy and specific dissipation rate, respectively.

Advertisement

4. Phenomenology of the CFD process applied in mixing of bioreactors

Mixing consists of making a uniform combination of two or more components, so it is present in many processes [31]. When analyzing air change rates of natural ventilation in buildings designated for agricultural or livestock production, the mixing is present.

In industrial processes where chemical reactions are carried out, mixing promotes contact between the reactants improving process efficiency. Particularly in bioreaction processes, mixing influences substrate and product transport toward and from the location of conversion by microorganisms [32].

The effect of different modes of mixing on biogas production has been studied [3]. The main modes of mixing in biodigesters are as follows: biogas recirculation, impeller mixing and pumped circulation [33]. The mixing methods have greater impact when dealing with higher solids content materials. Often, the increase in the concentration of total solids in digestate generates important rheological changes.

4.1. Temperature and density gradients in fluid modeling

Fluid motion can occur on a temperature gradient and, consequently, mass transport phenomena by convection. Two models are basic for the analysis of this phenomenon: flotation model for natural convection, which considers the variation of density as a function of temperature and the Boussinesq model (Eq. (9)) that has given adequate results [34].

ρ=ρi1βTTiE9

where ρ is density, β is the thermal expansion coefficient and T is temperature.

The fluid movement assumes a mixture of liquid, vapor and nonconsumable gases. The standard equation governing the mixing model and the mixing turbulence model describing the flow of the mass vapor fraction (f) can be written as follows [35]:

ερf+ρvVf=γf+ReRcE10

where v is velocity vector, γ is the effective exchange coefficient and Re and Rc are terms included in the steam generation and condensation rate (rate of phase change).

Figure 6 shows the spatial distribution of velocity vectors, which leads to the entry of two solutions, under different fluid characteristics. According to the hypotheses presented, it is a turbulent flow whose centrifugal forces favor the separation of emulsions. Velocity increase at the exit of digester causes a change in mixture viscosity and consequently its ability to flow.

Figure 6.

Detail of the velocity vectors in the container (m s−1).

Because of the boundary conditions and flow characteristics, temperature distribution and corresponding density are shown in Figures 7 and 8, respectively. A parameter to qualify the process is the uniformity in the mixing, which in turn will be in function of the content of the solutions.

Figure 7.

Temperature contours (K) in mixing reactor.

Figure 8.

Density contours (kg m−3) in mixing digester.

4.2. Flow patterns in single-phase models

To evaluate hydrodynamic performance of anaerobic reactors, single-phase CFD models have been used [14, 19]. In these models, it is assumed that multiphase effects such as sedimentation of solids, bubble formation and biogas flow in the aqueous phase are negligible.

4.2.1. Covered lagoon digester

The treatment of large-scale organic wastes is carried out in covered lagoon reactors (Figure 9). In these reactors, it is usual to find stagnant zones, where the flow velocity is very low and affects the anaerobic digestion process efficiency. Reduction of stagnant areas in covered lagoon reactors is a challenge that has been addressed through the CFD model generation.

Figure 9.

Covered lagoon digester model.

The flow model consists of continuity (Eq. (11)) and Navier-Stokes equations for linear motion conservation (Eq. (12)) in its vector form at steady state, incompressible and isothermal flow [36].

·v=0E11
ρ·vv=·P+·τ̿+F̿E12

where τ̿ is defined by Eq. (13).

τ̿=µ·v+·vT23·vIE13

For the local turbulence calculations, transport equations for turbulent kinetic energy (k) and specific dissipation rate (ω) must be solved (Eqs. (7) and (8)). The incorporation of the Cross viscosity model to define the fluid rheology is done by programming and importing a user-defined function (UDF).

The hydrodynamic performance enhancement is achieved by recirculation incorporation in strategic sites. Streamlines (Figure 10) in the original configuration have two large swirls at the inflow; however, in most of the reactor, very low speeds are encountered. Vectors (Figure 11) show a velocity increase at the top and middle of the reactor when a recirculation is employed, which improves mixing and sludge digestion.

Figure 10.

Streamlines in a top view of covered lagoon reactor.

Figure 11.

Velocity vectors in configuration A (without recirculation) and B (with recirculation).

4.2.2. Anaerobic reactor with recirculating jets

Currently, the mixing by recirculating jets (Figure 12a) is used in industrial digesters to treat organic wastes. Usually these are containers provided with submerged jets pointing downward and have the function of recirculating the digestion fluid by the action of a pump [15]. For single-phase CFD model development, the geometry is simplified by delimiting the part corresponding to the liquid (Figure 12b and c).

Figure 12.

(a) The inside of a reactor with recirculating jets, (b) configuration of the jets in the liquid phase and (c) different jet configuration.

The inflow pipe length influences the velocity distribution within the container. Figure 13 shows that higher velocity is at reactor bottom, whereby a better homogenization is achieved because the bottom sediments are entrained by the generated stream and are dispersed throughout the reactor.

Figure 13.

(a) Reactor velocity contours with recirculating jets, (b) streamlines generated by spherical bottom and (c) streamlines on changing reactor bottom and jets length.

4.3. Multiphase flow

Although mixing modeling has been approached considering that flow in reactor is a single phase, cases in which the multiphase effect is considerable have also been considered [37]. Mixing modeling in anaerobic digestion processes should be approached considering the multiple phases involved in the process. The approaches used for multiphase flow description can be grouped into two types: the Eulerian approach and the Lagrangian approach [33].

4.4. Dead space in mixing vessels

Mixing dead zones detection is performed to improve mixing in digesters. Recirculation incorporation causes disturbances and material movement inside the digester and reduces dead spaces, increasing biogas production due to a better microorganism distribution in material.

To define a dead space (Figure 14), the concept of hydraulic retention time (HRT) has been used, that is, the time it takes the material to perform the path from inflow to outflow of digester [38]; mathematically, it is defined as follows:

HRT=VQE14

where V is total volume of digester and Q is volumetric flow at the digester inlet.

Figure 14.

Dead space (black area) in different inflow configurations.

Volumetric flow (Q) causes the material to have a certain mean velocity within the digester, whose magnitude is a result of the velocity vector (v), which has components in x, y, z (u, v, w). Therefore, to calculate the limit velocity to define a dead space, the following mathematical relationship is used.

vdead zonereactor lenght3HRTE15

Those regions where the velocity is less than or equal to the limit velocity (vvdead zone) are considered as dead space.

Advertisement

5. Conclusions

The mixing processes in anaerobic reactors are influenced not only by the inlet and outlet flows but also by the rheological properties of the fluid and the geometric characteristics of the reactor. There is an optimum mixing intensity that can maximize energy production with the lowest energy input possible for mixing. Beyond a point, there are no returns in terms of methane generation with increasing energy input. The variability of anaerobic digestion involves the application of different turbulence models of turbulence, which must be analyzed to determine the adjustment of results obtained with reality.

References

  1. 1. Meroney RN, Colorado PE. CFD simulation of mechanical draft tube mixing in anaerobic digester tanks. Water Research. 2009;43(4):1040-1050
  2. 2. Terashima M, Goel R, Komatsu K, Yasui H, Takahashi H, Li YY, et al. CFD simulation of mixing in anaerobic digesters. Bioresource Technology. 2009;100(7):2228-2233
  3. 3. Karim K, Thomas Klasson K, Hoffmann R, Drescher SR, DePaoli DW, Al-Dahhan MH. Anaerobic digestion of animal waste: Effect of mixing. Bioresource Technology. 2005;96(14):1607-1612
  4. 4. Wu B. Advances in the use of CFD to characterize, design and optimize bioenergy systems. Computers and Electronics in Agriculture. 2013;93:195-208
  5. 5. Espinosa-Solares T, Morales-Contreras M, Robles-Martínez F, García-Nazariega M, Lobato-Calleros C. Hydrodynamic characterization of a column-type prototype bioreactor. Applied Biochemistry and Biotechnology. 2008;147(1-3):133-142
  6. 6. Valle-Guadarrama S, Espinosa-Solares T, López-Cruz I, Domaschko M. Modeling temperature variations in a pilot plant thermophilic anaerobic digester. Bioprocess and Biosystems Engineering. 2011;34(4):459-470
  7. 7. Vesvikar MS, Al-Dahhan M. Flow pattern visualization in a mimic anaerobic digester using CFD. Biotechnology and Bioengineering. 2005;86(6):719-732
  8. 8. Bridgeman J. Computational fluid dynamics modelling of sewage sludge mixing in an anaerobic digester. Advances in Engineering Software. 2012;44(1):54-62
  9. 9. Wu B. CFD simulation of mixing in egg-shaped anaerobic digesters. Water Research. 2010;44(5):1507-1519
  10. 10. Wu B, Chen Z. An integrated physical and biological model for anaerobic lagoons. Bioresource Technology. 2011;102(8):5032-5038
  11. 11. Rao M. Rheology of Fluid, Semisolid, and Solid Foods: Principles and Applications. 3rd ed. Springer US: Boston, MA; 2014. 461 p
  12. 12. Sindall R, Bridgeman J, Carliell-Marquet C. Velocity gradient as a tool to characterise the link between mixing and biogas production in anaerobic waste digesters. Water Science & Technology. 2013;67(12):2800-2806
  13. 13. Wu J, Bi L, Zhang JB, Poncin S, Cao ZP, Li HZ. Effects of increase modes of shear force on granule disruption in upflow anaerobic reactors. Water Research. 2012;46(10):3189-3196
  14. 14. Wu B. CFD simulation of mixing for high-solids anaerobic digestion. Biotechnology and Bioengineering. 2012;109(8):2116-2126
  15. 15. Sajjadi B, Raman AAA, Parthasarathy R. Fluid dynamic analysis of non-Newtonian flow behavior of municipal sludge simulant in anaerobic digesters using submerged, recirculating jets. Chemical Engineering Journal. 2016;298:259-270
  16. 16. Wilkie AC. Anaerobic digestion of dairy manure: Design and process considerations. In: Dairy Manure Management: Treatment, Handling, and Community Relations. Ithaca, NY: Cornell University; 2005. pp. 301-312
  17. 17. Sharpe R, Harper L. Methane emissions from an anaerobic swine lagoon. Atmospheric Environment. 1999;33(22):3627-3633
  18. 18. Craig KJ, Nieuwoudt MN, Niemand LJ. CFD simulation of anaerobic digester with variable sewage sludge rheology. Water Research. 2013;47(13):4485-4497
  19. 19. Wu B, Chen S. CFD simulation of non-Newtonian fluid flow in anaerobic digesters. Biotechnology and Bioengineering. 2008;99(3):700-711
  20. 20. Baroutian S, Eshtiaghi N, Gapes DJ. Rheology of a primary and secondary sewage sludge mixture: Dependency on temperature and solid concentration. Bioresource Technology. 2013;140:227-233
  21. 21. Eshtiaghi N, Yap SD, Markis F, Baudez J-C, Slatter P. Clear model fluids to emulate the rheological properties of thickened digested sludge. Water Research. 2012;46(9):3014-3022
  22. 22. Espinosa-Solares T, Tecante A, Tanguy PA. Flow patterns in rheologically evolving model fluids produced by hybrid dual mixing systems. Chemical Engineering & Technology. 2001;24(9):913-918
  23. 23. Versteeg HK, Malalasekera W. An Introduction to Computational Fluid Dynamics: The Finite Volume Method. 2nd ed. Pearson Education: Harlow, England; 2007. 503 p
  24. 24. Wu B. CFD investigation of turbulence models for mechanical agitation of non-Newtonian fluids in anaerobic digesters. Water Research. 2011;45(5):2082-2094
  25. 25. Alexopoulos A, Maggioris D, Kiparissides CCFD. Analysis of turbulence non-homogeneity in mixing vessels: A two-compartment model. Chemical Engineering Science. 2002;57(10):1735-1752
  26. 26. Vakili M, Esfahany MN. CFD analysis of turbulence in a baffled stirred tank, a three-compartment model. Chemical Engineering Science. 2009;64(2):351-362
  27. 27. Kasat G, Khopkar A, Ranade V, Pandit A. CFD simulation of liquid-phase mixing in solid–liquid stirred reactor. Chemical Engineering Science. 2008;63(15):3877-3885
  28. 28. Launder BE, Spalding DB. The numerical computation of turbulent flows. Computer Methods in Applied Mechanics and Engineering. 1974;3(2):269-289
  29. 29. Coughtrie AR, Borman DJ, Sleigh PA. Effects of turbulence modelling on prediction of flow characteristics in a bench-scale anaerobic gas-lift digester. Bioresource Technology. 2013;138:297-306
  30. 30. Wilcox DC. Formulation of the k-w turbulence model revisited. AIAA Journal. 2008;46(11):2823-2838
  31. 31. Brennan JG, editor. Food Processing Handbook. Weinheim, Germany: Wiley-VCH Verlag GmbH & Co. KGaA; 2006. 582 p
  32. 32. Van’t Riet K, Van der Lans R. Mixing in bioreactor vessels. In: Moo-Young M., editor. Comprehensive Biotechnology. 2nd ed. Elsevier; 2011. p. 63-80
  33. 33. Wu B. CFD simulation of gas and non-Newtonian fluid two-phase flow in anaerobic digesters. Water Research. 2010;44(13):3861-3874
  34. 34. Boulard T, Wang S. Radiactive and convective heterogeneity in a plastic tunnel: Consequences on crop transpiration. Plasticulture. 2002;121:22-35
  35. 35. ANSYS-FLUENT. User's Guide. Lebanon: Ansys Inc.; 2009
  36. 36. Çengel YA, Cimbala JM. Fluid Mechanics: Fundamentals and Applications. NY: McGraw Hill; 2006. 929 p
  37. 37. Dapelo D, Alberini F, Bridgeman J. Euler-Lagrange CFD modelling of unconfined gas mixing in anaerobic digestion. Water Research. 2015;85:497-511
  38. 38. Gerardi MH. The Microbiology of Anaerobic Digesters. New Jersey: John Wiley & Sons; 2003. 177 p

Written By

Jorge Flores-Velazquez, Abraham Jesus Arzeta-Rios, Waldo Ojeda Bustamante and Teodoro Espinosa-Solares

Submitted: 07 April 2017 Reviewed: 02 November 2017 Published: 20 December 2017