Electrodiffusion Phenomena in Neuroscience and the Nernst–Planck–Poisson Equations

Jasielec, Jerzy J.

doi:10.3390/electrochem2020014

Cited by 14 publications

(6 citation statements)

References 191 publications

(270 reference statements)

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“…A new model was proposed to predict the rate of phenol electrosorption onto beads by incorporating the transport phenomena defined by the Nernst-Planck equation (Jasielec, 2021) that include diffusion, electromigration and convection. Electromigration was neglected with the simulated effluent since the phenol molecule (pKa = 9.95) is uncharged at the applied pH of 4.…”

Section: Modelingmentioning

confidence: 99%

Electrosorption of phenolic compounds from olive mill wastewater: Mass transport consideration under a transient regime through an alginate-activated carbon fixed-bed electrode

Lissaneddine

Pons

Aziz

et al. 2022

Journal of Hazardous Materials

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Section: Modelingmentioning

confidence: 99%

Electrosorption of phenolic compounds from olive mill wastewater: Mass transport consideration under a transient regime through an alginate-activated carbon fixed-bed electrode

Lissaneddine

Pons

Aziz

et al. 2022

Journal of Hazardous Materials

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“…Studying non-linear electrokinetics using numerical models requires an important disclaimer about assumptions. The two critical assumptions are called the "constant field" and "electroneutrality" assumptions 44,45 . In fact, the electroneutrality assumption leads to paradox, or circular argument, in which the electric field is solved assuming no charge separation but the effect of the electric field induces charge separation which changes the electric field 46 .…”

Section: Numerical Modelmentioning

confidence: 99%

Negative Mem-Capacitance and Warburg Ionic Filtering in Asymmetric Nanopores

Farajpour

Bandara

Sharma

et al. 2022

Preprint

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The pervasive model for a solvated, ion-filled nanopore is often a resistor in parallel with a capacitor. Although the simple model suggests that ionic current can flow through both components, under voltage-clamped conditions, capacitive currentshouldbe negligible. However, non-linear electrokinetics routinely predict voltage and capacitance fluctuations that can lead to otherwise anomalous current transients. We aimed to test the hypothesis that voltage and/or capacitance can fluctuate despite distant electrodes being clamped at a specified voltage. The first supportive piece of evidence for this theory is the appearance ofnegativecapacitance within the nanopore sensor which is characterized by long equilibration times and is observed only under millimolar salt concentrations. Next, we used the transient occlusion of the pore using λ-DNA and 10-kbp DNA to test whether events are being attenuated by this purely ionic phenomenon. We conclude the study with a new interpretation of molecular translocations which is not only based on the pulse-like resistance changes but rather a complex and non-linear pseudo-steady state that changes during molecular transit.

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“…Yet, even though individual ion channels can be represented in the EMI model framework, the model does not represent the strong gradients in ion concentrations close to these channels. In order to study the electrodiffusion close to active ion channels placed in the cell membrane, it is necessary to solve the Poisson-Nernst-Planck equations (PNP, see, e.g., [ 7 , 8 ]) which models electrodiffusion at ∼nm level. These equations are challenging to solve numerically because very strong gradients necessitate extremely fine spatial (∼0.5 nm) and temporal (∼0.01 ns) resolutions.…”

Section: Introductionmentioning

confidence: 99%

Nano-scale solution of the Poisson-Nernst-Planck (PNP) equations in a fraction of two neighboring cells reveals the magnitude of intercellular electrochemical waves

et al. 2023

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The basic building blocks of the electrophysiology of cardiomyocytes are ion channels integrated in the cell membranes. Close to the ion channels there are very strong electrical and chemical gradients. However, these gradients extend for only a few nano-meters and are therefore commonly ignored in mathematical models. The full complexity of the dynamics is modelled by the Poisson-Nernst-Planck (PNP) equations but these equations must be solved using temporal and spatial scales of nano-seconds and nano-meters. Here we report solutions of the PNP equations in a fraction of two abuttal cells separated by a tiny extracellular space. We show that when only the potassium channels of the two cells are open, a stationary solution is reached with the well-known Debye layer close to the membranes. When the sodium channels of one of the cells are opened, a very strong and brief electrochemical wave emanates from the channels. If the extracellular space is sufficiently small and the number of sodium channels is sufficiently high, the wave extends all the way over to the neighboring cell and may therefore explain cardiac conduction even at very low levels of gap junctional coupling.

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Electrodiffusion Phenomena in Neuroscience and the Nernst–Planck–Poisson Equations

Cited by 14 publications

References 191 publications

Electrosorption of phenolic compounds from olive mill wastewater: Mass transport consideration under a transient regime through an alginate-activated carbon fixed-bed electrode

Electrosorption of phenolic compounds from olive mill wastewater: Mass transport consideration under a transient regime through an alginate-activated carbon fixed-bed electrode

Negative Mem-Capacitance and Warburg Ionic Filtering in Asymmetric Nanopores

Nano-scale solution of the Poisson-Nernst-Planck (PNP) equations in a fraction of two neighboring cells reveals the magnitude of intercellular electrochemical waves

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