Mixture model applied to the development of polymeric fibre diaphragms

Moura Junior, Celso Fidelis de; Nunes, Raquel Araújo; Silva, Rafael Teles Cruz; Lira, Hélio de Lucena; Cunha, Carlos Thiago Cândido; Vilar, Eudésio Oliveira

doi:10.1590/S1517-707620210004.1363

ABSTRACT

The extraction and use of asbestos have been banned around the world because of its damage effects to the human health, it leads to studies of new materials in order to replace asbestos in several processes. The objective of this paper is to apply the simplex lattice planning and the mixture model in the manufacture of diaphragms. A mixture model was performed according to the simplex lattice, using four polyethylene microfibers (MF's) of different lengths, with 1st degree polynomial, adding inner and central points and a repetition, generating 18 mixtures. The results showed that microfibers of greater length have a greater influence on the diaphragms properties, presenting a more significant result on permeability. From the linear regression it was possible to estimate a mathematical model combining the three properties of the diaphragm, presenting a correlation of 92.12%.

Keywords
Simplex lattice; model; polymeric diaphragm; microfibers

1. INTRODUCTION

Caustic soda (NaOH) and chlorine (Cl₂) are basic raw materials for the world chemical industry. More than 50% of sales in the sector depend, at some stage of their production process, of these inputs [¹1 ANDRADE, J.E.P., ZAPORSKI, J., “A indústria de cloro-soda”, Revista do BNDS, v. 1, n.2, pp. 491-498.].

The process of chlorine-soda production by electrochemistry occurs through the passage of an electric current through the brine where, by electrolysis, there is the formation of chlorine gas, caustic soda and hydrogen gas.

Currently, three electrolysis processes are the most widely used industrially: mercury, diaphragm and membrane. According to the report presented by the Brazilian association of the industry of alkalis, chlorine and derivatives – Abiclor, diaphragm cell technology was the most used by this sector in brazil in 2014, corresponding to 62% of the installed capacity (9% of diaphragms without asbestos and 53% with chrysotile). In 2017, diaphragm technology corresponded to 13.9% of the world chlorine-soda production [²2 EUROCHLOR. Industry Review 2016-2017.].

The first cells with asbestos diaphragm were successful between 1928 and 1948 [³3 HINE, F., O’BRIEN, T.F., BOMMARAJU, T.V., Handbook of chlor-alkali technology, Springer-New York, 2005.

4 CALDWELL, D.L., Tutorial Lectures in Electrochemical Engineering and Technology. R.C. Alkire e Der-Tau Chin, editors, 3, AIChE Symposium Series, 229: 79, 1983;-⁵5 ROMINE, R., Diaphgram cell technology, oxytech systems, Inc., Chardon, Ohio Usa, Presented at The Electrode Corp. Chlorine/Chlorate Seminar, São Paulo, 1977.]. However, since 1970, researcher have been conducted to develop asbestos-free diaphragms, mainly due to the prevailing laws that objecting to their banishment. The main diaphragms that have achieved commercial purposes are basically constituted of fibrous polymeric material, resistant to the corrosive atmosphere of the cell, the example of perfluorinated polymers such as polytetrafluorethylene (PTFE) [³3 HINE, F., O’BRIEN, T.F., BOMMARAJU, T.V., Handbook of chlor-alkali technology, Springer-New York, 2005., ⁶6 DUBOIS, D.W., DILMORE, C.R., Diaphragm for use in chlor-alkali cells. United States Patent N. 5,192,401, 1993] companies such as Eltech Systems and PPG Industries have made significant progress in the development of new diaphragms. Eltech has developed the called Polyramix (PMX) with some superior properties to asbestos, while PPG Industries developed the Tephram, a diaphragm formed by PTFE fibers, microfibers, Nafion^® among other constituents [³3 HINE, F., O’BRIEN, T.F., BOMMARAJU, T.V., Handbook of chlor-alkali technology, Springer-New York, 2005.]. The PMX is produced from the physical combination of metallic oxide particles and a fluorocarbon resin, presenting a branched, irregular and flexible structure, with lengths of 1-7 mm and diameter of 10-100 µm [⁷7 CURLIN, L.C., FLORKIEWICZ, T.F., MATOUSEK, R.C., “Polymarix: A depositable replacement for asbestos diaphragms”, Modern Chlor-Alkali Technology, v.4, 334-335, 1990.].

In beginning of the 90´s, rhone poulenc chemie developed the so-called "embedded pre-cathode diaphragms". These consist of two layers, both porous deposited in the cathode. The first layer, the preform, consists of a conductive fibrous material, an electrocatalyst (e.g. Raney Ni), a pore-forming agent and a fluoropolymer. The second layer is a ptfe-based composition with a pore-forming agent [⁸8 KUNTZBURGER, F., HORBEZ, D., LEHELLOCO, J.G., et al. “New developments in built-in precathode diaphragm technology”, Modem Chlor-Alkali Technology, v. 7, p. 181, 1998.].

Decades have sought to optimize diaphragms and replace asbestos as raw material of the separators in the electrolysis of brine. It is remarkable that over time several advances have been achieved, such as the insertion of polytetrafluoroethylene fibers, and inorganic oxides. Although the environment in the electrolytic cell is quite aggressive, there is a range of other materials that can be employed such as polymeric fibers and clays [⁹9 CUNHA, C.T.C., Desenvolvimento e avaliação de diafragmas poliméricos para aplicação no processo de produção eletrolítica de cloro-soda. Thesis PhD, Federal University of Campina Grande/CCT/UAEQ, Campina Grande- PB, Brazil, 2015.].

In brazil in the mid-2004, pioneering studies were looking for another type of material that was not perfluorated in order to minimize costs while maintaining satisfactory performance. According to [¹⁰10 VIANA, K.M.S., VILAR, E.O., LIRA, H.L., et al. “Avaliação do desempenho do compósito amianto/polietileno durante a eletrólise da salmoura”, Revista eletrônica de materiais e processos, v. 3, pp. 12-19, 2008.], which studied the manufacture of diaphragms from the mixture of asbestos and polyethylene fibers, the results were promising by numerous advantages, such as the high chemical and mechanical resistance. In the work of [⁹9 CUNHA, C.T.C., Desenvolvimento e avaliação de diafragmas poliméricos para aplicação no processo de produção eletrolítica de cloro-soda. Thesis PhD, Federal University of Campina Grande/CCT/UAEQ, Campina Grande- PB, Brazil, 2015.], polyethylene fibers and clays diaphragms showed excellent results regarding permeability and resistivity when compared to data obtained for asbestos diaphragms.

Based on this information, the aim of this study is to relate the materials used in the manufacture of diaphragms with their physical properties, based in mixing model and using method of simplex lattice in order to propose mathematical models that explain these relationships.

2. MATERIALS AND METHODS

In this work, four types of commercial ultra-high-molecular-weight polyethylene (UHMWPE) microfibers (MF’s) (table 1), with different lengths were used, to manufacture diaphragms. All microfibers were selected according to their chemical and stability characteristics, and all resistant to the operating conditions of the electrochemical reactor (pH between 2 and 13 and temperatures between 50 ºC and 80 ºC) as well as to high concentrations of chlorine and alkali, as shown by [¹¹11 VIANA, K.M.S. Diafragmas de PEUAPM para aplicação no processo de produção eletrolítica de cloro-soda. 2009. 113 f. Tese (Doutorado em Engenharia de Processos) - Universidade Federal de Campina Grande, Campina Grande, 2009.] and on described on the fabrics technical data sheet.

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Table 1
UHMWPE microfiber used in the manufacture of diaphragms.

Kelcocrete, provide by CpKelco, was used as a thickening agent and Atagel, provide by BASF was used as a porosity control agent, mineral brine at room temperature with a NaCl concentration around 320.0 g/L at room temperature was used.

2.1 Preparation and characterization of diaphragms

The methodology used in the preparation of the diaphragms was based on the work developed by [⁹9 CUNHA, C.T.C., Desenvolvimento e avaliação de diafragmas poliméricos para aplicação no processo de produção eletrolítica de cloro-soda. Thesis PhD, Federal University of Campina Grande/CCT/UAEQ, Campina Grande- PB, Brazil, 2015.]. The diaphragms were characterized as to the thickness, permeability and resistivity. The resistivity, N_mac, was based on the work carried out by [¹²12 POUSH, K.A., CALDWELL, D.L., VAN ZEE, J., et al., 1983. “Characterization of asbestos diaphgrams for chlor-alkali electrolysis”, Modern Chlor-Alkali Technology, 2, Edited by C. Jackson. Ellis Horwood Limited.].

2.2 Simplex Lattice Project

The simplex lattice is a mechanism for optimizing the proportions of ingredients in mixing projects, by combining mathematical theory, statistical analysis and experimental design [¹³13 GORMAN, J.W., HINMAN, J.E., 1962. “Simplex Lattice Designs for Multicomponent Systems”, Technometrics, 4, 4, 463-487.].

The experimental space of a mixture with p components is reduced to a simplex region limited by the conditions:

x_{i} \geq 0, 1 \leq i \leq p

(1)

Σ_{i = 1}^{p} x_{i} = 1,

(2)

where x_i represents the proportion of the i-th component. This equation removes a degree of freedom from the proportions.

The experimental space, which contains the p components of the mixture, can be geometrically represented by the interior and boundaries (vertex, edges, faces) of a regular simplex (p-1) – dimension [¹⁴14 CORNELL, J. “A.,Experiments with mixtures: A review”. Technometrics, v. 15, n. 3, pp. 437-455, 1973, ¹⁵15 CORNELL, J.A., “Experiments with mixtures: Designs, models, and the analysis of misture data”. John Wiley & Sons, Inc. 3, 23, 1981.]. Fig. 1 [¹⁶16 NUNES, D.B., Rotinas para otimização experimental de misturas, Dissertation Federal University of the Rio Grande do Sul, MsC, Porto Alegre-RS, Brazil, 1998] represents experimental spaces of a simplex.

Figure 1
Experimental space for: (a) two, (b) three and (c) four components.

According to 4 MF’s the simplex lattice mixture planning method was used with a 1^st degree polynomial, added interior points, a central point and a repetition. The method generated 18 assays, where each assay corresponds to a diaphragm. In Table 2, the experiments generated with the respective proportions are shown.

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Table 2
Experimental Planning type Simplex-Lattice for 4 components.

2.3 Mathematical model of mixtures

To evaluate the properties of the diaphragms, the special linear, quadratic and cubic models proposed by [¹⁷17 SCHEFFÉ, H., 1958. Experiments with wixtures. Journal of the statistical society series b, 20, 344-360,] were tested and represented by equations 1, 2 and 3, respective

Y (β, x) = Σ_{i = 1}^{q} β_{i} x_{i}

(1)

Y (β, x) = Σ_{i = 1}^{q} β_{i} x_{i} + Σ Σ_{i < j}^{q} β_{i j} x_{i} x_{j}

(2)

Y (β, x) = Σ_{i = 1}^{q} β_{i} x_{i} + Σ Σ_{i < j}^{q} β_{i j} x_{i} x_{j} + Σ Σ Σ_{i < j < k}^{q} β_{i j k} x_{i} x_{j} x_{k}

(3)

Where y(β, x) represents the response function and β is the interaction coefficient. The variables x_i, x_j and x_k represent the independent variables of the process.

Using the STATISTICA software (version 10, doe Statsoft inc. Tulsa, USA), the models were evaluated based on the analysis of variance (ANOVA), and the interaction coefficients were analyzed through the tukey test. Through this method, the pareto charts were obtained, and the significance of the coefficients of each proposed model was evaluated.

3. RESULTS AND DISCUSSION

For the diaphragm to be considered ideally applicable in the production of chlorine-soda, it must present a low value of thickness, permeability and resistivity along with resistance to the severe conditions of the operation of the electrochemical cell.

For a diaphragm to have a good result it must be thin, as thickness is directly linked to cell voltage and energy consumption, and it must present a low permeability because, according to [¹⁰10 VIANA, K.M.S., VILAR, E.O., LIRA, H.L., et al. “Avaliação do desempenho do compósito amianto/polietileno durante a eletrólise da salmoura”, Revista eletrônica de materiais e processos, v. 3, pp. 12-19, 2008.], permeability is a determining parameter of the migration of anionic species. Anionic migration causes the reverse migration of hydroxyls from the cathodic to the anodic compartment, forming sodium hypochlorite that increases consumption generated chlorine, thus decreasing the efficiency of the electrolysis process [¹⁸18 LIMA, P.R., MIRAPALHETA, A., DOS SANTOS ANDRADE, M.H.; et al. “Energy loss in electrochemical diaphragm process of chlorine and alkali industry–A collateral effect of the undesirable generation of chlorate”. doi: https://doi.org/10.1016/j.energy.2010.01.039. Energy, v. 35, n. 5, p. 2174-2178, 2010.
https://doi.org/10.1016/j.energy.2010.01... ]. Lastly, a diaphragm must have a low N_mac value, as this parameter characterizes the resistivity of the diaphragm for the energy efficiency of the process, where, the lower the separator resistivity, the lower the N_mac and the lower the overall energy consumption [¹⁹19 CALDWELL, D.L., POUSH, K.A., WHITE, R.E., et al., Mathematical model of the chlorine cell diaphragm. Electrochemical Society 161st Meeting. Montreal, Canadá, 1982.].

Table 3 shows the mean values of the thickness and permeability as well as the resistivity responses of the diaphragms developed from the experimental mix planning.

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Table 3
Experimental values obtained from the characterization of the diaphragms according to the simplex-lattice planning.

Using the experimental proportions and the response variables (thickness, permeability and resistivity) from the construction of the simplex-lattice design, the analysis of variance was used to define and evaluate the regression model and the significance of the independent factors. For the analysis, a statistical significance level of 5% was chosen, where, the model and factors are significant when they present a p-value less than or equal to 5%.

Table 4 presents the equations generated for the special cubic model and the ANOVA results for the three studied properties, represented by the value of the fisher test (f-value), the p-value and the r² adjustment coefficient. The effects x₂x_4,x₃x_4,x₁x₂x_4,x₁x₃x₄ and x₂x₃x₄ could not be estimated because they are linear combinations of other effects.

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Table 4
Results of the variance analysis (ANOVA) for the properties of the diaphragms.

Although it offers an adjustment coefficient of 99.23%, indicating that the model can explain 99.23% of the total variation around the average, the proposed model for the variable thickness is not statistically significant within the error probability of 5% (p > 0.05), a significant analysis of the coefficients is necessary.

The pareto charts, shown in fig. 2, present the main effects and interactions of the independent variables with the thickness, permeability and resistivity for the special cubic model. The variable interactions have a confidence limit of 95%, and, estimating the significance of the coefficients calculated for each model was possible based on this analysis.

Figure 2
Pareto charts of the independent variables and their interactions: a) for thickness; b) for permeability and c) for resistivity.

As seen by analyzing fig. 2a, only linear factors X₁, X₂, X₃ and X₄ have a significant effect on the thickness variable. Both have a positive factor, that is higher for MF78, meaning the greater the mass of this microfiber in the diaphragm composition, the greater the diaphragm’s thickness will be. This is related to the fact that MF78 possesses the longest fiber length, which leads to higher packing of the fibers during their deposition on the cathode. This fact is evidenced by [²⁰20 ALMEIDA FILHO, E.M., VILAR, E.O., FEITOZA, A.C.O., 2011. “Physical-chemical characterization and statistical modeling applied in a chlor-alkali diaphragm-cell process”. Chemical Engineering Research and Design. 89, 491-498.], who showed that an increase in the amount of long fibers in relation to the quantity of short fibers causes the thickness to increase and the packaging of the diaphragm to decrease. A high diaphragm thickness leads to a greater cell voltage, resulting in greater energy consumption in the process. In addition, the binary interaction between X₁X₂ presents a synergistic interaction that increases the thickness. Thus, taking only the significant effects into consideration, the cubic order model for the thickness can be estimated as:

L = 0.255 * X_{1} + 0.218 * X_{2} + 0.395 * X_{3} + 0.435 * X_{4} + 2.621 * X_{1} * X_{2}

(4)

In Fig. 2b, according to the values of the "t" test, the special cubic model was able to predict the linear relationship and the effects of the quadratic and cubic interaction on the permeability of the diaphragms. As in the thickness analysis, the parameter that presented the most significant influence on the permeability was MF78. This influence is related to the number of pores formed when longer fibers are deposited over the cathode. These pores lead to an increase in the percolation of the brine. The binary interactions X₁X_3,X₁X₄ and X₂X₃ result in a lower permeability than the estimated average values and lead to an antagonistic effect on the permeability. In other words, these interactions produce a decrease in the thickness of the diaphragm. The interaction X₁X₂and X₁X₂X₃ promote a synergistic interaction, increasing the permeability of the diaphragm.

For resistivity, the magnitude of the parameters shown in Fig. 2c, give a significant positive result of the main effects on resistivity, and these resistivity effects are, more pronounced in the parameter MF78. The resistivity of the diaphragms is directly related to theirs thickness, and the analysis performed for thickness corroborates this fact. The binary interactions X₁X₃, X₁X₄ and X₂X₃ have an antagonistic effect, favoring a decrease in the resistivity of the diaphragms. This effect is more pronounced in the interaction between MF50 and MF78.

Since it is directly linked to the energy cost of the process, resistivity is an important variable, and a qualitative analysis of the effects of thickness and permeability on the resistivity of the diaphragm was complete. Considering the thickness and permeability as independent variables, a multiple linear regression was performed in order to estimate a mathematical model that explains the relationship between the thickness, permeability and resistivity.

Per the results of the ANOVA in Table 5, the model is useful for predicting the resistivity because its p-value from the F test is much lower than the value of 0.05 of the error probability. The model can explain the 92.12% of the resistivity variability, thus proving the two variables are related to the resistivity of the diaphragms. The regression model is represented by Equation 5.

N_{m a c} = 1.15 - 0.1764 * L + 0.0198 * K

(5)

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Table 5
Variance analysis of multiple linear regression.

Figure 3 illustrates the surface graph to a linear regression of conductivity. Is possible to observe a direct relationship between the dependent variables with the conductivity, showing a negative correlation to the thickness and positive correlation to the permeability, presenting an adjust of data to the R² model superior to 92%. We can observe that the conductivity increases proportionally as the permeability of the diaphragm increases.

Figure 3
Surface graph of N_mac versus permeability and thickness.

In Figures 4a and 4b we can observe the conductivity estimates as a function of thickness and permeability. When the parameters are evaluated individually, it is possible to notice a moderate correlation (r = 0.58) between the thickness and the N_mac of the diaphragms, this parameter not being sufficient to determine the resistivity of the diaphragms. However, when we analyzed only the permeability, we observed a strong relationship between the permeability and resistivity data of the diaphragms (r = 0.98), that is, when we increase the permeability to a factor of 1 cm², the resistivity of the diaphragm increases, on average, 0. 01726.

Figure 4
Graph of resistivity as a function of the thickness and permeability constructed from the linear regression of the data obtained with the pure species: a) Thickness b) Permeability.

4. CONCLUSIONS

This study examined the application of the simples lattice mixture model in the development of diaphragms for use in the production of chlor-alkali. A strong relationship between the length of the fibers and diaphragm’s properties was observed within this statistical analysis. The analysis showed that the smaller the fiber length was, the more effective the diaphragm’s performance. Based on the multiple linear regression method, the correlation between the properties of the diaphragm could be explained. The model presented a correlation of 92.12%. proving that the thickness and permeability of the diaphragm are directly related to the resistivity.

ACKNOWLEDGMENTS

The authors thanks to CNPq and CAPES for their financial support of this work and the Electrochemical Engineering Laboratory of UFCG (LEEq/UFCG).

BIBLIOGRAPHY

¹
ANDRADE, J.E.P., ZAPORSKI, J., “A indústria de cloro-soda”, Revista do BNDS, v. 1, n.2, pp. 491-498.
²
EUROCHLOR. Industry Review 2016-2017.
³
HINE, F., O’BRIEN, T.F., BOMMARAJU, T.V., Handbook of chlor-alkali technology, Springer-New York, 2005.
⁴
CALDWELL, D.L., Tutorial Lectures in Electrochemical Engineering and Technology. R.C. Alkire e Der-Tau Chin, editors, 3, AIChE Symposium Series, 229: 79, 1983;
⁵
ROMINE, R., Diaphgram cell technology, oxytech systems, Inc., Chardon, Ohio Usa, Presented at The Electrode Corp. Chlorine/Chlorate Seminar, São Paulo, 1977.
⁶
DUBOIS, D.W., DILMORE, C.R., Diaphragm for use in chlor-alkali cells United States Patent N. 5,192,401, 1993
⁷
CURLIN, L.C., FLORKIEWICZ, T.F., MATOUSEK, R.C., “Polymarix: A depositable replacement for asbestos diaphragms”, Modern Chlor-Alkali Technology, v.4, 334-335, 1990.
⁸
KUNTZBURGER, F., HORBEZ, D., LEHELLOCO, J.G., et al “New developments in built-in precathode diaphragm technology”, Modem Chlor-Alkali Technology, v. 7, p. 181, 1998.
⁹
CUNHA, C.T.C., Desenvolvimento e avaliação de diafragmas poliméricos para aplicação no processo de produção eletrolítica de cloro-soda. Thesis PhD, Federal University of Campina Grande/CCT/UAEQ, Campina Grande- PB, Brazil, 2015.
¹⁰
VIANA, K.M.S., VILAR, E.O., LIRA, H.L., et al “Avaliação do desempenho do compósito amianto/polietileno durante a eletrólise da salmoura”, Revista eletrônica de materiais e processos, v. 3, pp. 12-19, 2008.
¹¹
VIANA, K.M.S. Diafragmas de PEUAPM para aplicação no processo de produção eletrolítica de cloro-soda. 2009. 113 f. Tese (Doutorado em Engenharia de Processos) - Universidade Federal de Campina Grande, Campina Grande, 2009.
¹²
POUSH, K.A., CALDWELL, D.L., VAN ZEE, J., et al, 1983. “Characterization of asbestos diaphgrams for chlor-alkali electrolysis”, Modern Chlor-Alkali Technology, 2, Edited by C. Jackson. Ellis Horwood Limited.
¹³
GORMAN, J.W., HINMAN, J.E., 1962. “Simplex Lattice Designs for Multicomponent Systems”, Technometrics, 4, 4, 463-487.
¹⁴
CORNELL, J. “A.,Experiments with mixtures: A review”. Technometrics, v. 15, n. 3, pp. 437-455, 1973
¹⁵
CORNELL, J.A., “Experiments with mixtures: Designs, models, and the analysis of misture data”. John Wiley & Sons, Inc 3, 23, 1981.
¹⁶
NUNES, D.B., Rotinas para otimização experimental de misturas, Dissertation Federal University of the Rio Grande do Sul, MsC, Porto Alegre-RS, Brazil, 1998
¹⁷
SCHEFFÉ, H., 1958. Experiments with wixtures. Journal of the statistical society series b, 20, 344-360,
¹⁸
LIMA, P.R., MIRAPALHETA, A., DOS SANTOS ANDRADE, M.H.; et al “Energy loss in electrochemical diaphragm process of chlorine and alkali industry–A collateral effect of the undesirable generation of chlorate”. doi: https://doi.org/10.1016/j.energy.2010.01.039. Energy, v. 35, n. 5, p. 2174-2178, 2010.
» https://doi.org/10.1016/j.energy.2010.01.039
¹⁹
CALDWELL, D.L., POUSH, K.A., WHITE, R.E., et al, Mathematical model of the chlorine cell diaphragm. Electrochemical Society 161^st Meeting Montreal, Canadá, 1982.
²⁰
ALMEIDA FILHO, E.M., VILAR, E.O., FEITOZA, A.C.O., 2011. “Physical-chemical characterization and statistical modeling applied in a chlor-alkali diaphragm-cell process”. Chemical Engineering Research and Design 89, 491-498.

Publication Dates

Publication in this collection
05 Jan 2022
Date of issue
2021

History

Received
18 Oct 2019
Accepted
23 Dec 2020

This is an Open Access article distributed under the terms of the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

[1] ¹
ANDRADE, J.E.P., ZAPORSKI, J., “A indústria de cloro-soda”, Revista do BNDS, v. 1, n.2, pp. 491-498.

[2] ²
EUROCHLOR. Industry Review 2016-2017.

[3] ³
HINE, F., O’BRIEN, T.F., BOMMARAJU, T.V., Handbook of chlor-alkali technology, Springer-New York, 2005.

[4] ⁴
CALDWELL, D.L., Tutorial Lectures in Electrochemical Engineering and Technology. R.C. Alkire e Der-Tau Chin, editors, 3, AIChE Symposium Series, 229: 79, 1983;

[5] ⁵
ROMINE, R., Diaphgram cell technology, oxytech systems, Inc., Chardon, Ohio Usa, Presented at The Electrode Corp. Chlorine/Chlorate Seminar, São Paulo, 1977.

[6] ⁶
DUBOIS, D.W., DILMORE, C.R., Diaphragm for use in chlor-alkali cells United States Patent N. 5,192,401, 1993

[7] ⁷
CURLIN, L.C., FLORKIEWICZ, T.F., MATOUSEK, R.C., “Polymarix: A depositable replacement for asbestos diaphragms”, Modern Chlor-Alkali Technology, v.4, 334-335, 1990.

[8] ⁸
KUNTZBURGER, F., HORBEZ, D., LEHELLOCO, J.G., et al “New developments in built-in precathode diaphragm technology”, Modem Chlor-Alkali Technology, v. 7, p. 181, 1998.

[9] ⁹
CUNHA, C.T.C., Desenvolvimento e avaliação de diafragmas poliméricos para aplicação no processo de produção eletrolítica de cloro-soda. Thesis PhD, Federal University of Campina Grande/CCT/UAEQ, Campina Grande- PB, Brazil, 2015.

[10] ¹⁰
VIANA, K.M.S., VILAR, E.O., LIRA, H.L., et al “Avaliação do desempenho do compósito amianto/polietileno durante a eletrólise da salmoura”, Revista eletrônica de materiais e processos, v. 3, pp. 12-19, 2008.

[11] ¹¹
VIANA, K.M.S. Diafragmas de PEUAPM para aplicação no processo de produção eletrolítica de cloro-soda. 2009. 113 f. Tese (Doutorado em Engenharia de Processos) - Universidade Federal de Campina Grande, Campina Grande, 2009.

[12] ¹²
POUSH, K.A., CALDWELL, D.L., VAN ZEE, J., et al, 1983. “Characterization of asbestos diaphgrams for chlor-alkali electrolysis”, Modern Chlor-Alkali Technology, 2, Edited by C. Jackson. Ellis Horwood Limited.

[13] ¹³
GORMAN, J.W., HINMAN, J.E., 1962. “Simplex Lattice Designs for Multicomponent Systems”, Technometrics, 4, 4, 463-487.

[14] ¹⁴
CORNELL, J. “A.,Experiments with mixtures: A review”. Technometrics, v. 15, n. 3, pp. 437-455, 1973

[15] ¹⁵
CORNELL, J.A., “Experiments with mixtures: Designs, models, and the analysis of misture data”. John Wiley & Sons, Inc 3, 23, 1981.

[16] ¹⁶
NUNES, D.B., Rotinas para otimização experimental de misturas, Dissertation Federal University of the Rio Grande do Sul, MsC, Porto Alegre-RS, Brazil, 1998

[17] ¹⁷
SCHEFFÉ, H., 1958. Experiments with wixtures. Journal of the statistical society series b, 20, 344-360,

[18] ¹⁸
LIMA, P.R., MIRAPALHETA, A., DOS SANTOS ANDRADE, M.H.; et al “Energy loss in electrochemical diaphragm process of chlorine and alkali industry–A collateral effect of the undesirable generation of chlorate”. doi: https://doi.org/10.1016/j.energy.2010.01.039. Energy, v. 35, n. 5, p. 2174-2178, 2010.
» https://doi.org/10.1016/j.energy.2010.01.039

[19] ¹⁹
CALDWELL, D.L., POUSH, K.A., WHITE, R.E., et al, Mathematical model of the chlorine cell diaphragm. Electrochemical Society 161^st Meeting Montreal, Canadá, 1982.

[20] ²⁰
ALMEIDA FILHO, E.M., VILAR, E.O., FEITOZA, A.C.O., 2011. “Physical-chemical characterization and statistical modeling applied in a chlor-alkali diaphragm-cell process”. Chemical Engineering Research and Design 89, 491-498.

MICROFIBER (MF)	LENGTH (MM)	AVARAGE DIAMETER (μm)
MF50	0.1	5
MF02	0.6	15
MF05	0.9	1.2
MF78	1.6	1.2

	COMPONENTS (g)				PSEUDO-COMPONENT
ESSAY	MF50	MF05	MF02	MF78	X₁	X₂	X₃	X₄
1	1.6	0	0	0	1.000	0	0	0
2	0	1.6	0	0	0	1.000	0	0
3	0	0	1.6	0	0	0	1.000	0
4	0	0	0	1.6	0	0	0	1.000
5	1.0	0.2	0.2	0.2	0.625	0.125	0.125	0.125
6	0.2	1.0	0.2	0.2	0.125	0.625	0.125	0.125
7	0.2	0.2	1.0	0.2	0.125	0.125	0.625	0.125
8	0.2	0.2	0.2	1.0	0.125	0.125	0.125	0.625
9	0.4	0.4	0.4	0.4	0.250	0.250	0.250	0.250
10	1.6	0	0	0	1.000	0	0	0
11	0	1.6	0	0	0	1.000	0	0
12	0	0	1.6	0	0	0	1.000	0
13	0	0	0	1.6	0	0	0	1.000
14	1.0	0.2	0.2	0.2	0.625	0.125	0.125	0.125
15	0.2	1.0	0.2	0.2	0.125	0.625	0.125	0.125
16	0.2	0.2	1.0	0.2	0.125	0.125	0.625	0.125
17	0.2	0.2	0.2	1.0	0.125	0.125	0.125	0.625
18	0.4	0.4	0.4	0.4	0.250	0.250	0.250	0.250

ESSAY	MF50 (%)	MF05 (%)	MF2 (%)	MF78 (%)	L (cm)	K X 10^-8 (cm²)	N_mac
1	100	0	0	0	0.242	0.731	1.12
2	0	100	0	0	0.178	0.847	1.14
3	0	0	100	0	0.505	5.800	1.16
4	0	0	0	100	0.427	13.700	1.35
5	62.5	12.5	12.5	12.5	0.356	3.860	1.16
6	12.5	62.5	12.5	12.5	0.286	5.050	1.21
7	12.5	12.5	62.5	12.5	0.228	0.699	1.15
8	12.5	12.5	12.5	62.5	0.277	7.350	1.23
9	25	25	25	25	0.248	5.380	1.22
10	100	0	0	0	0.269	0.710	1.13
11	0	100	0	0	0.259	0.867	1.12
12	0	0	100	0	0.286	5.710	1.18
13	0	0	0	100	0.443	14.100	1.39
14	62.5	12.5	12.5	12.5	0.362	3.890	1.17
15	12.5	62.5	12.5	12.5	0.304	5.000	1.19
16	12.5	12.5	62.5	12.5	0.228	0.663	1.12
17	12.5	12.5	12.5	62.5	0.315	7.980	1.20
18	25	25	25	25	0.294	5.170	1.22

PROPERTIES	EQUATION	F	p	R²
L (cm)	L = 0.255X₁+0.219X₂+0.395X₃+0.435X₄ + 2.621X₁X₂+0.133X₁X₃-1.210X₁X₄-1.805X₂X₃- 2.488X₁X₂*X₃	16.17	0.19^ Not significant at the level of 5% error probability.	99.23%
K (cm²)	Kx10⁸= 0.720X₁+0.857X₂+5.800X₃+13.900X₄+ 61.193* X₁X₂-47.494 X₁X₃-23.118 X₁X₄-53.305 X₂X₃+248.776 X₁X₂X₃	1040.9	<0.001^* * Significant to the level of 5% probability of error.	99.99%
*N_mac*	Nmac = 1.125X₁+1.130X₂+1.17X₃+1.370X₄+0.685* X₁X₂- 0.675 X₁X₃-0.907 X₁X₄-1.062 X₂X₃+9.200 X₁X₂X₃	42.99	<0.001^* * Significant to the level of 5% probability of error.	97.45%

	gl	SQ	MQ	F	F OF SIGNIFICATION
Regression	2	0.086696	0.043348	87.69317	<<0.0001
Residue	15	0.007415	0.000494
Total	17	0.094111

Brasil

Brasil

Mixture model applied to the development of polymeric fibre diaphragms

ABSTRACT

1. INTRODUCTION

2. MATERIALS AND METHODS

2.1 Preparation and characterization of diaphragms

2.2 Simplex Lattice Project

2.3 Mathematical model of mixtures

3. RESULTS AND DISCUSSION

4. CONCLUSIONS

ACKNOWLEDGMENTS

BIBLIOGRAPHY

Publication Dates

History