Abstracts
Abstract
Water pollution is increasingly becoming an issue of global concern, especially in developing countries. Therefore, the development of affordable, reliable, low-maintenance, electricity-free technologies for reducing biological and chemical pollutants in drinking water to an acceptable level for human consumption is an interesting topic of research. The suitability of metallic iron (Fe0) as a universal filter material has been recently discussed. Iron/sand filters have a great potential for rural regions where source water may be subjected to various microbial and chemical contaminations. This is based on the fact that corroding iron has the ability to remove all soluble species by an unspecific mechanism. This article develops a mathematical model of iron(Fe0)/sand filter taking into account the loss of porosity during the filtration process. The porosity loss with time is calculated using the rate of formation of corrosion products. The time after which the porosity is reduced to zero indicating a zero flow rate is estimated. The mass transport advection-dispersion equation is derived to predict, through numerical simulation, the spatiotemporal distribution of pollutants and the flow rate in the filter as well as the water quality at the exit of the filter. The control parameters are the iron proportion, the volume of sand particles, the height of the filter and the sorption coefficient. It is found that the pollutant removal percentage and the service life of the filter depend on the relative proportions of sand and iron in the filter.
For instance, taking the guideline equal to be 25% of the influent concentration, simulation results demonstrated that by mixing sand and iron particles in proportion of 40 vol% Fe0, the filter can be used continuously for 83 months.
Keywords:
- filtres fer/sable,
- modèle mathématique,
- perte de porosité du filtre,
- équation d’advection-dispersion,
- simulation numérique,
- répartition des polluants,
- durée de vie du filtre
Résumé
La pollution des eaux devient de plus en plus un problème d’intérêt mondial, particulièrement dans les pays en voie de développement. Par conséquent, le développement de technologies à faible coût et faciles à maintenir, pour réduire les polluants dans les sources d’eau à boire à un niveau acceptable pour la consommation, est un sujet de recherche intéressant. Cet article développe un modèle mathématique de filtre à base de particules de fer (Fe0) et de sable en tenant compte de la perte de porosité au cours du processus de traitement de l’eau. La réduction de la porosité au cours du temps est calculée en tenant compte de la vitesse de formation des produits de corrosion. Le temps après lequel la porosité est réduite à zéro, impliquant un débit d’eau nul à travers le filtre, est calculé. L’équation d’advection-dispersion est établie pour prédire, par simulation numérique, la répartition spatiotemporelle des polluants et le débit d’eau à travers le filtre ainsi que la qualité de l’eau à la sortie du filtre. Les paramètres de contrôle sont la proportion de fer, la taille des particules de fer, la hauteur de la colonne et le coefficient de sorption. Il est trouvé que le pourcentage de dépollution et la durée de vie du filtre dépendent des proportions relatives des particules de sable et du fer. Par exemple, prenant un seuil tolérable de 25 % de la concentration des polluants à l’entrée du filtre, les résultats des simulations montrent qu’en mélangeant le fer et le sable dans une proportion de 40 % en volume de fer, le filtre peut être utilisé en continu pendant une période de 83 mois.
Mots-clés :
- filtres fer/sable,
- modèle mathématique,
- perte de porosité du filtre,
- équation d’advection-dispersion,
- simulation numérique,
- répartition des polluants,
- durée de vie du filtre
Article body
1. Introduction
Water pollution mostly results from (i) natural mobilization/leaching, (ii) mining activities, (iii) industrial discharge, (iv) agricultural discharge (e.g. fertilizers, herbicides, pesticides), (v) solid waste disposal, and (vi) unplanned urban and rural development. Poor water quality has damaging impacts on human health, aquaculture and ecology. In general, water quality problems for human health fall into two major categories: (i) microbiological contamination responsible for immediate acute diseases and (ii) chemical contamination, which poses cumulative and chronic health risks to human beings and aquatic life (Ahamedet al., 2009).
The scientific community is on schedule to develop universal water treatment units for domestic use (Clasenet al., 2009). The suitability of metallic iron (Fe0) as universal filter material has been recently discussed (Noubactepet al., 2010). It is based on the fact that corroding iron has the ability to remove all soluble species by an unspecific mechanism. There are however two main modifications in the design of Fe0/sand filter in comparison to the Kanchan Arsenic Filter (KAF) developed and distributed in Nepal by Ngaiet al. (2007): (i) the Fe-oxide-producing unit (Fe0/sand bed) is placed after the conventional Biosand filter (BSF) and (ii) the Fe0/sand bed contains an optimal proportion of Fe0 mixed to sand to extend the filter service life.
In this paper, an approximate and feasible mathematical model that allows for the prediction of concentration profiles of aqueous pollutants is developed. The prediction is based on time and height measurements in a Fe0/sand bed according to the variation of the pore space within the filter as expansive corrosion proceeds. The service life of the filter is operationally defined as the time to reach (i) 75% porosity loss and (ii) more than 75% removal from a 100% influent contaminant concentration. This assumption is justified by the fact that chemical pollutants typically occur in trace amounts, rarely considerably larger than the maximum contaminant levels (KÜMMERER, 2011). It is found that the pollutant removal percentage and the service life of the filter depend on the relative proportions of sand and iron in the filter.
2. Physical model description
Let us consider a layer of water containing contaminants as shown in Figure 1. H is the height and D the diameter of the bed. Water, which is considered as an incompressible and Newtonian fluid, flows toward the bottom of the column (porous medium) by gravity. The column which contains a mixture of spherical particles (sand + metallic iron) of equal size constitutes the filter.
2.1 Filtration velocity and variation of porosity of the filter
In the case where the water flows towards the column by gravity, the filtration velocity follows the Darcy law (Marle, 2006). Therefore the flow velocity modulus in the filter is a temporal function given as:
with , , ρ is the density of water, d0 is the diameter of iron and sand particles, H is the height of the cylinder, ϕ is the porosity based on porosity loss kinetics (Mackenzieet al., 1999), hwater the height of water, µ the dynamic viscosity. nFe is the number of iron particles, αp is the porosity losses rate and t the operation time. δ is the fraction volume of particles. This expression of the porosity has been derived recently by the authors (Noubactepet al., 2010).
2.2 Mass transport equation for pollutants in the filter
The spatiotemporal variation of pollutants in the filter obeys the following equation:
This equation describes a microscopic mass balance using Fick’s law adapted to macrodispersion (Rooklidgeet al., 2005). The hydrodynamic dispersion coefficient, Dz, includes turbulence effects caused by species and gravity. ρb is the iron bulk density of the porous media, n the sorption intensity parameter and Kf the sorption capacity parameter (Williamset al., 2003). The main feature of this equation 2 is the time dependence of the flow velocity q and the porosity ϕ. This time dependence is seen hereafter to be an important factor that makes the theoretical prediction similar to what is found from the experimental investigation. This equation 2 can be coupled to a transfer equation that describes the transfer of water and its pollutants to the filter (Peelet al., 1980; 1981). However, this equation is not necessary here since it is assumed that the pollutant concentration at the entrance of the filter is assumed known and constant. The main concern is to find out how the effects of time dependence of the porosity affects the concentration of pollutants at the exit or at any point of the filter.
The initial and boundary conditions related to the transport equation are C (z, 0) = C0 if z = 0, if not C (z, 0) = 0, i.e. initially uncontaminated column; C (0, t) = C0, where C0 is the concentration of pollutants at the entrance of the filter and H the depth of the filter. The following values of the parameters are used. ρ = 1000 kg•m-3, g = 9.81 m•s-2, d0 = 1.2 mm, μ = 0.01 g•s-1•cm-1, hwater = 20 cm, H = 50 cm, δ = 0.64, D = 50 cm (this gives a cylindrical bed volume equal to 98 L), Dz = 0.14 cm2•min-1 (Williams et al., 2003), ρb = 7800 kg•m-3, n = 0.32, Kf = 278 L•kg-1. We remind the reader that the sand density is equal to 2650 kg•m-3. The determination of nc, which is the threshold number of iron particles necessary to fill completely the initial volume of pores, is obtained as the ratio between total volume of pores in the filter and the volume of expansive corrosion product minus the mean value of the iron particle (Caréet al., 2008, Noubactepet al., 2010). With the above values it is found that nc≈20 x 106 (which corresponds to about 141 kg of iron).
3. Results and discussion
3.1 Temporal distribution of solutes
Equation 2 is solved numerically. The spatial derivative is discretized using the backward finite difference scheme while the time derivative is handled using the fourth order Runge-Kutta computer routine written in FORTRAN. The value of concentration of the pollutant at the entrance of the filter is C0 = 0.35 mg•L-1. Figure 2a presents the time variation of the pollutant concentration at the filter exit for different values of the number of iron particles. It is found that the pollutant concentration at the exit increases with time and decreases when the number of iron particles increases. If one assumes that 25% of the pollutant concentration is tolerable, then the service time of the filter is found to be more than 83 months for 20 x 106 iron particles. In contrast, Figure 2b shows that for 20 x 106 iron particles and assuming that the porosity is constant (as considered in most of the scientific papers), the service time of the filter is approximately 17.2 months. This demonstrates that the long-term performance of the filter is assured by the iron corrosion product formed continuously over the iron surface. To end this section, we note that the numerical simulation can help to find out how the pollutant concentration evolves over the filter length, showing the action of the zero valent iron in the removal process of pollutants (Youet al., 2005).
3.2 Validation of the model implementation
To validate the correct implementation of the model, the experimental breakthrough curve obtained by Sanghamitra and Gupta (2005) is used (see Figure 2 of this reference). The transport Equation 2 is then solved numerically with input parameters provided by the same authors (C0 = 2 mg•L-1, n = 0.53, Kf = 2.67 L•g-1, V = 0.41 m•min-1). For three different bed depths, Figure 3 shows the results obtained from our simulation for a pollutant in the influent against time (in hours, h). Our figure and that of Sanghamitra and Gupta (2005) reveal agreement for the treated pollutant system. Therefore, our model can be used to predict the breakthrough curves. By taking into account the porosity loss, which is one factor that affects the performance and lifetime of the granular iron media, the new model developed in this work can therefore be used to predict the long-term performance of filters.
4. Conclusion
From an analysis on a typical cylindrical sand/iron filter and the kinetics of iron corrosion in water, an equation describing the spatiotemporal variation of pollutant concentration in the filter has been developed. The numerical simulation has been used to monitor the spatial and temporal variation of the pollutant concentration. It has been found that by taking into account the time variation of the porosity due to the reduction of porosity by the corrosion products, the mathematical model gives results similar to what is obtained from experimental investigations.
This study constitutes a step towards a more complete design of an affordable filter that can be for community access to safe drinking water. But this requires further studies such as, for instance, long-term experimental data for fixed bed column operations on pollutant removal by sorption onto iron/sand filters, after the model has taken into account the transfer processes between the liquid phase (water) and the surface of the filter (entrance side).
Appendices
Ackwnoledments
The authors thank R. Ntchantcho, Hydrogeologic Centre at the National Institute of Geological and Mining Research, Yaoundé-Cameroon, for insightful comments and fruitful suggestions.
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