Numerical Solution of the Coupled Nernst−Planck and Poisson Equations for Liquid Junction and Ion Selective Membrane Potentials

Sokalski, Tomasz; Lingenfelter, Peter; Lewenstam, Andrzej

doi:10.1021/jp026406a

Cited by 163 publications

(167 citation statements)

References 87 publications

(134 reference statements)

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“…A series of numerical simulations have been reported in the past for membranes of ion-selective electrodes [18][19][20][21][22][23][24][25], for liquid junctions of reference electrodes [22,24] and for diffusion layers of other electrode systems [26][27][28][29]. In an early contribution, Buck's group introduced digital simulations for investigating the electrical behavior of membranes based on liquid ionexchangers [18,19].…”

Section: Introductionmentioning

confidence: 99%

“…Buck also pioneered a more general treatment that accounts for space-charge influences according to the Poisson equation [21]. Recently, Lewenstam's group presented a new version of this space-charge approach and reported different applications to membranes and liquid junctions [22,24,25].…”

Section: Introductionmentioning

confidence: 99%

“…The resulting net charge concentrations are usually well below the range of the total ion concentrations, except for extremely thin membranes [6,31]. A further limitation of space-charge approaches is their need for highly involved, implicit mathematical procedures, which may become a critical factor [22,24,25]. Even more seriously, none of the earlier attempts of simulating ISEs accounted for the presence of a stagnant solution film adhering to the electrode.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Computer simulation of ion-selective membrane electrodes and related systems by finite-difference procedures

Morf

Pretsch

Rooij

2007

Journal of Electroanalytical Chemistry

116

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A simple but powerful numerical simulation for analyzing the electrochemical behavior of ionselective membranes and liquid junctions is presented. The computer modeling makes use of a finiteelement procedure in the space and time domains, which can be easily processed (e. g., with MS Excel software) without the need for complex mathematical evaluations. It leads to convincing results on the dynamic evolution of concentration profiles, potentials, and fluxes in the studied systems. The treatment accounts for influences of convection, flow, or stirring in the sample solution that act on the boundary diffusion layer and it is even capable of including the effects of an electrolyte flow through the whole system. To minimize the number of arbitrary parameters, interfacial reactions are assumed to be near local equilibrium, and space-charge influences are considered via phase-boundary potential differences. The applicability of the computer simulation is demonstrated for different ionselective membranes as well as for liquid junctions. The numerical results are in excellent agreement with experimental data.

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Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Computer simulation of ion-selective membrane electrodes and related systems by finite-difference procedures

Morf

Pretsch

Rooij

2007

Journal of Electroanalytical Chemistry

116

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“…Rudolph [16] simulated electrical migration and diffuse double-layer effects using a fast implicit finite difference algorithm, which was developed as a part of a general tool for modeling electrochemical processes related to electroanalytical chemistry. Liquid junction and ion selective membrane potentials were studied using a numerical model based on the time-dependent NPP equations by Sokalski et al [17]. Bieniasz [18] extended his numerical technique based on the finite-difference patch-adaptive strategy to time-dependent models involving electrodiffusion transport described by NPP equation systems in one-dimensional space geometry.…”

Section: Numerical Solutions Of the Full Set Of The Time-dependent Nementioning

confidence: 99%

Numerical simulations of the full set of the time-dependent Nernst-Planck and Poisson equations modeling electrodiffusion on a simple ion channel.

Valent¹

2012

JCIS

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The concept of electrodiffusion based on the Nernst-Planck equations for ionic fluxes coupled with the Poisson equation expressing relation between gradient of the electric field and the charge density is widely used in many areas of natural sciences and engineering. In contrast to the steady-state solutions of the Nernst-Planck-Poisson (abbreviated as NPP or PNP) equations, little is known about the time-dependent behavior of electrodiffusion systems. We present numerical solutions of an NPP system modeling dynamics in the interior of a membrane channel containing an electrolyte after a potential jump at one side of the membrane (voltage-clamp). The NPP equations were solved using the VLUGR2 solver based on an adaptive-grid finite-difference method with an implicit timestepping. The used approach allows for solving the full set of the NPP equations without approximations such as the electroneutrality or constant-field assumptions. Calculations reveal interesting nonlinear time evolution of the ionic concentrations and potential.

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“…A significant progress in the improvement of analytical parameters of these sensors, concerning lower detection limit, higher sensitivity and selectivity, is owing to new constructions and membrane compositions as well as precise tailoring of ion fluxes in the membrane and at the membrane-sample solution interface [1][2][3]. Theoretical studies, based initially on simplified models taking into account a steady state diffusion [4][5][6] and then on more advanced models [7][8][9][10] as well as those based on Nernst-Planck-Poisson equations [11,12], are related to this issue.…”

Section: Introductionmentioning

confidence: 99%

A simple currentless method of determination of ion fluxes to and within electroactive ion-exchange membranes

Gryczan

Michalska

Maksymiuk

2014

J Solid State Electrochem

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A simple protocol applicable for the determination of ion fluxes from a solution to an ion-exchange membrane and within it was proposed. Advantages of this method include the application of a simple typical potentiometric set-up, as the method uses open circuit potential measurements; thus, the membrane state is not biased by external polarization. The proposed approach is based on the analysis of potential vs. time dependences in the course of building up or disappearance of a diffusion layer in a solution, controlled by solution stirring. Using equations describing diffusion processes, both ion fluxes from a solution to a membrane and within the membrane can be calculated. Experimental studies were carried out on examples of electrodes coated by two different kinds of membranes: (i) poly(vinyl chloride)-based silverselective membrane and (ii) polypyrrole film doped by poly(4-styrenesulfonate) ions, in solutions of silver ions. The results obtained for non-saturated silver-selective membranes highlight the role of membrane thickness and conditioning time as well as confirm the role of diffusion in the membrane as a rate-determining step. For polypyrrole layers, the ion flux results from silver deposition in the surface part of a conducting polymer film, and the flux value was found consistent with silver deposition rate determined earlier.

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Numerical Solution of the Coupled Nernst−Planck and Poisson Equations for Liquid Junction and Ion Selective Membrane Potentials

Cited by 163 publications

References 87 publications

Computer simulation of ion-selective membrane electrodes and related systems by finite-difference procedures

Computer simulation of ion-selective membrane electrodes and related systems by finite-difference procedures

Numerical simulations of the full set of the time-dependent Nernst-Planck and Poisson equations modeling electrodiffusion on a simple ion channel.

A simple currentless method of determination of ion fluxes to and within electroactive ion-exchange membranes

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