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Electrochemical impedance spectroscopy response of water uptake in organic coatings by finite element methods

By Stafford, O.A.; Hinderliter, B.R. & Croll, S.G.
Published in Electrochimica Acta 2006

Abstract

The corrosion of metals is a long standing topic of research which is of immense economic importance. One of the principal means of preventing surface corrosion of metals is thin polymer coatings, i.e. paint. These coatings often fail because of the passage of water or other active ionic species into and through the polymer coating. Since both the capacitance and the resistance of a polymer coating change as it absorbs water, electrochemical impedance spectroscopy (EIS) gives a general idea of how much water a polymer has been absorbed. Theories, such as the Brasher–Kingsbury approximation, are effective medium theories based on the assumption that the absorbed water is randomly distributed in spherical inclusions. The water in a coating may be distributed as spherical inclusions, as discrete channels, or as some combination that transports water from the coating surface until the water reaches the metal substrate and corrosion can begin. The resistance and the capacitance of a coating depend on both the amount of water (volume fraction) and the shape of the water inclusions. EIS gives only a general idea of how much water has been absorbed by a coating but does not provide the distribution or shape of the water inclusions. EIS circuit response is often modeled with the equivalent circuit elements describing the material properties for water inclusions that are implicitly assumed to be randomly distributed spherical inclusions. Numerical calculations using the finite element analysis (FEA) are reported here to solve Maxwell's equations for various shapes and sizes of water inclusions within the polymer. Calculations here have been based on the electrical properties of a polyvinyl fluoride film, as an exemplar, with water inclusions of different shapes and concentrations (water volume fraction). The Brasher–Kingsbury approximation gives the correct outcome only for a random distribution of spherical inclusions, as expected. Other shapes and distributions can vary from the Brasher–Kingsbury prediction of water volume fraction by more than 50% of the actual gravimetric water volume fraction. Results are presented here for spherical and cylindrical randomly distributed water inclusions. Understanding the sensitivity to different distributions and numbers of inclusions is an objective planned for future research.

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