Potential theory of Polanyi

The potential theory of Polanyi, also called Polanyi adsorption potential theory, is a model of adsorption proposed by Michael Polanyi where adsorption can be measured through the equilibrium between the chemical potential of a gas near the surface and the chemical potential of the gas from a large distance away. In this model, he assumed that the attraction largely due to Van Der Waals forces of the gas to the surface is determined by the position of the gas particle from the surface, and that the gas behaves as an ideal gas until condensation where the gas exceeds its equilibrium vapor pressure. While the adsorption theory of Henry is more applicable in low pressure and BET adsorption isotherm equation is more useful at from 0.05 to 0.35 P/Po, the Polanyi potential theory has much more application at higher P/Po (~0.1–0.8).

Michael Polanyi
Michael Polanyi, FRS (11 March 1891 – 22 February 1976) was a Hungarian polymath, who made theoretical contribution to physical chemistry, economics, and philosophy. Polanyi was a well known theoretical chemist who contributed to the chemistry field through three main areas of study: adsorption of gases on solids, x-ray structure analysis of the properties of solids, and the rate of chemical reactions. However, Polanyi was active in both theoretical and experimental studies within the Chemistry field. Polanyi obtained a degree in medicine in 1913 as well as a Ph.D. in physical chemistry in 1917 from the University of Budapest. Later in his life, he taught as a chemistry professor at the Kaiser Wilhelm Institute in Berlin as well as the University of Manchester in Manchester, England.

Proposed theory
In 1914, Polanyi wrote his first paper proposed on adsorption where he proposed a model for the adsorption of gas onto a solid surface. Afterwards, he published a fully developed paper in 1916, which included experimental verification by his students and other authors. During his research in the University of Budapest, his mentor, Professor Georg Bredig, sent his research findings to Albert Einstein. Einstein wrote back to Bredig stating: "The papers of your M. Polanyi please me a lot. I have checked over the essentials in them and found them fundamentally correct." Polanyi later described this event by saying: "Bang! I was a scientist." Polanyi and Einstein continued to write to each other on and off for the next 20 years.

Criticism
Polanyi's model of adsorption was met with much criticism for several decades after publication years. His simplistic model for determining adsorption was formed during the time of the discovery of Debye's fixed dipoles, Bohr's atomic model, and well as the developing theory of intermolecular forces and electrostatic forces by key figures in the chemistry world including W.H. Bragg, W.L. Bragg, and Willem Hendrik Keesom. Opponents of his model claimed that Polanyi's theory did not take into account these emerging theories. Criticism included that the model did not take into account the electrical interactions of the gas and the surface, and that the presence of other molecules would screen off the attraction of the gas to the surface. Polanyi's model was furthermore put under scrutiny following the experimental claims of Irving Langmuir from 1916 to 1918 through whose research would eventually win the Nobel Prize in 1932. However, Polanyi was not able to participate in many of these discussions because he served as a medical officer for the Austro-Hungarian army in the Serbian front during World War I. Polanyi wrote about this experience saying: "I myself was protected for a while against any knowledge of these developments by serving as a medical officer in the Austro-Hungarian Army from August 1914 to October 1918, and by the subsequent revolutions and counter revolutions that lasted until the end of 1919. Members of less-well-informed circles elsewhere continued to be impressed for some time by the simplicity of my theory and its wide experimental verifications."

Defense
Polanyi described that the “turning point” of the acceptance of his model of adsorption occurred when Fritz Haber asked him to defend his theory in full in the Kaiser Wilhelm Institute for Physical Chemistry in Berlin, Germany. Many key players in the scientific world were present in this meeting including Albert Einstein. After hearing Polanyi's full explanation of his model, Haber and Einstein claimed that Polanyi “had displayed a total disregard for the scientifically established structure of the matter”. Years later, Polanyi described his ordeal by concluding, "Professionally, I survived the occasion only by the skin of my teeth." Polanyi continued to provide supporting evidence in proving the validity of his model years after this meeting.

Refutation
Polanyi's 'deliverance' (as he described it) from these rejections and criticism of his model occurred in 1930, when Fritz London proposed a new theory of cohesive forces founded on the theories of quantum mechanics on the polarization of electronic systems. Polanyi wrote to London asking, "“Are these forces subject to screening by intervening molecules? Would a solid acting by these forces possess a spatially fixed adsorption potential?”" After computational analysis, a joint publication was made between Polanyi and London claiming that the adsorptive forces behaved similarly to the model that Polanyi had proposed.

Further research
Polanyi's theory has historical significance whose work has been used a foundation for other models, such as the theory of volume filling micropores (TVFM) and the Dubinin–Radushkevich theory. Other research have been performed loosely involving the potential theory of Polanyi such as the capillary condensation phenomenon discovered by Zsigmondy. Unlike Poylani's theory which involves a flat surface, Zsigmondy's research involves a porous structure like silica materials. His research proved that condensation of vapors can occur in narrow pores below the standard saturated vapour pressure.

Polanyi potential adsorption theory
The Polanyi potential adsorption theory is based on the assumption that the molecules near a surface move according to a potential, similar to that of gravity or electric fields. This model is applicable in the case of gases at a surface at constant temperature. Gas molecules move closer to that surface when the pressure is higher than the equilibrium vapor pressure. The change in potential relative to the distance from the surface can be calculated using the formula for difference of the chemical potential,


 * $$ \mathrm{d}\mu = -S_{\rm m} \, \mathrm{d}T + V_{\rm m} \, \mathrm{d}p + \mathrm{d}U_{\rm m} $$

where $$\mu$$ is the chemical potential, $$S_{\rm m}$$ is the molar entropy, $$V_{\rm m}$$ is the molar volume, and $$U_{\rm m}$$ is the molar internal energy.

At equilibrium, the chemical potential of a gas at a distance $$r$$ from a surface, $${\mu (r,p_r)}$$, is equal to the chemical potential of the gas at an infinitely large distance from the surface, $${\mu (\infty,p)}$$. As a result, the integration from an infinitely far distance to r distance from the surface leads to


 * $$ \int_{\mu (\infty,p)}^{\mu (r,p_r)} \mathrm{d}\mu = {\mu (r,P_r)} - {\mu (\infty,p)} = 0$$

where $$p_r$$ is the partial pressure at distance r and $$p$$ is the partial pressure at infinite distance from the surface.

Since the temperature remains constant, the difference in chemical potential formula can be integrated over pressures $$p$$ and $$p_r$$


 * $$ \int_{p}^{p_r} V_{\rm m} \, \mathrm{d}P + U_{\rm m}(r) - U_{\rm m}(\infty)= 0$$

By setting the $$U_{\rm m}(\infty)= 0$$, the equation can be simplified to


 * $$-U_{\rm m}(r) = \int_{p}^{p_r} V_{\rm m} \, \mathrm{d}p$$

Using the ideal gas law, $$pV_{\rm m} = RT$$, the following formula is obtained


 * $$-U_{\rm m}(r) = \int_{p}^{p_r} \frac{RT}{p} \mathrm{d}p = RT \ln \frac{p_r}{p}$$

Since gas condenses into a liquid on a surface when the pressure of the gas exceeds the equilibrium vapor pressure, $$p_0$$, we can assume a liquid film forms over the surface of thickness, $$\delta$$. The energy at $$p_0$$ is


 * $$U_{\rm m}(\delta) = -RT  \ln \frac{p_0}{p}$$

Considering that the partial pressure of the gases relates to the concentration, the adsorption potential, $$\varepsilon_{\rm s}$$ can be calculated as


 * $$\varepsilon_{s}= - RT \ln \frac{c_{\rm s}}{c}$$

where $$c_{\rm s}$$ is the saturated concentration of adsorbate and $$c$$ is the equilibrium concentration of the adsorbate.

Theories based on Polanyi adsorption theory
The potential theory underwent many refinements and changes throughout the years since its first report. One major theories of note that was developed using Polanyi's theory was the Dubinin theories, Dubinin–Radushkivech and Dubinin–Astakhov equations.

Using the adsorption potential, the degree of filling of the adsorption space, $$\theta$$, can be calculated as


 * $$\theta = a/a_0 = \mathrm{e}^{{({A / E})}^b }$$

where $$a$$ is value of adsorption at temperature T and equilibrium pressure p, $$a_0$$ is the maximum value of adsorption, and $$E$$ is the characteristic energy of adsorption in kJ/mol, $$A$$ is the loss in Gibbs free energy in adsorption equal to $$\Delta G = - RT \log (p_0/p) $$ and $$b$$ is the fitting coefficient. The Dubinin–Radushkivech equation where $$b$$ is equal to 2 and the optimized Dubinin-Astakhov equation where $$b$$ is fit to experimental data can be simplified to


 * $$\log a = \log a_0 + 0.434 \left(\frac{A}{E}\right)^b$$

[[File:Dubinin-Astakhov Curves.png|thumb|800px|Changes in Dubinin–Astakhov curves due to increases in Q0, E, and b on a log-log scale plot of solute isotherms on a sorbent versus relative solute concentration. Top-left: Q0 = 60; b = 1

Top-right: Q0 = 60; b = 1.5

Bottom-left: Q0 = 60; E = 20

Bottom-right: E = 20; b = 1.5]]

Other studies have used the Dubinin–Astakhov in a similar form of $$\log q_{\rm e} = \log Q^0 + (\varepsilon_{\rm sw}/E)^b$$,

where $$q_{\rm e}$$ is equilibrium adsorbed concentration of adsorbent in mg/g, $$Q^0$$ is maximum adsorbed concentration of adsorbent in mg/g, $$\varepsilon_{\rm sw}$$ is the effective adsorption potential, where equal to $$\varepsilon_{\rm sw} = -RT \ln (c_{\rm e}/c_{\rm s})$$, $$c_{\rm e}$$ is equilibrium concentration of adsorbent in the solution phase in mg/L, and $$c_{\rm s}$$ is the adsorbent solubility in water in mg/L.

The characteristic energy of adsorption can be related to a characteristic energy of adsorption for a standard vapor on the same surface, $$E_0$$, through the use of an affinity coefficient, $$\beta$$


 * $$E= \beta E_0$$

The affinity coefficient is a ratio of the properties of the sample and standard vapors


 * $$\beta = \frac{\alpha}{\alpha_0}$$

where $$\alpha$$ and $$\alpha_0$$ are the polarizabilities of the sample and standard vapors, respectively. Many studies have been performed to determine optimal fitting coefficients, $$b$$, and affinity coefficients, $$\beta$$, to best describe the adsorption of gases and vapors onto solids. As a result, the Dubinin–Astakhov equation remains in use in adsorption studies due to the accuracy it can obtain when fitted with experimental results.

Application
In many modern studies, the Polanyi theory is widely used in the study of activated carbons, or carbon black. The theory has been successfully used to model a variety of scenarios such as the gas adsorption on activated carbon and the adsorption process of nonionic polycyclic aromatic hydrocarbons. Later on, experiments also showed that it can model ionic polycyclic aromatic hydrocarbons such as phenols and anilines. More recently, the Polyani adsorption isotherm has been used to model to adsorption of carbon nanoparticles.

Characterization of carbon nanoparticles
Historically, the theory was used to model nonuniform adsorbates and multi-components solutes. For certain pairs of adsorbates and adsorbents, the mathematical parameters of the Polyani theory can be related to the physicochemical properties of both adsorbents and adsorbates. The theory has been used to model the adsorption of carbon nanotubes and carbon nanoparticles. In the study done by Yang and Xing, the theory have been shown to better fit the adsorption isotherm than Langmuir, Freundlich, and partition. The experiment studied the adsorption of organic molecules on carbon nanoparticles and carbon nanotubes. According to the Polyani theory the surface defect curvatures of carbon nanoparticles could affect their adsorption. Flat surfaces on the particles will allow more surface atoms to approach adsorbing organic molecules which will increase the potential, leading to stronger interactions. The theory has been beneficial in trying to understand the adsorption mechanisms of organic compounds on carbon nanoparticles and estimating the adsorption capacity and affinity. Using this theory, researchers are hoping to be able to design carbon nanoparticles for specific needs such as using them as sorbents in environmental studies.



Adsorption from different systems
In one of the earlier studies conducted by Manes, M., & Hofer, L. J. E., the Polyani theory was used to characterize liquid-phase adsorption isotherms on various concentrations activated carbon using a wide range of organic solvent. The polyani theory was shown to be a good fit for these various systems. Because of the results, the study introduced the possibility of predicting isotherms for similar systems using minimal data. However, the limitation is that the adsorption isotherms for a large variety of solvents can only fit over a limited range. The curve was not able to fit the data at high-capacity range. The study also concluded that there were a few anomalies in the results. The adsorption from carbon tetrachloride, cyclohexane, and carbon disulfide onto activated carbon was not able to fit well to the curve, and remain to be explained. The researchers who conducted the experiment speculate that steric effects of carbon tetrachloride and cyclohexane may have played a role. The study has been done with a variety of systems such as organic liquids from water solutions and organic solids from water solutions.

Competitive adsorption
Since a variety of systems have been investigated, a study was done to investigate the individual adsorption of a mixed solution. This phenomenon is also called competitive adsorption because solutes tend to compete for the same adsorption sites. In the experiment conducted by Rosene and Manes, the competitive adsorption of glucose, urea, benzoic acid, phthalide, and p-nitrophenol. Using the Polanyi adsorption model, they were able to calculate the relative adsorption of each compound onto the surface of activated carbon.