Transient dynamics of electric double layer capacitors: Exact expressions within the Debye-Falkenhagen approximation.
We revisit a classical problem of theoretical electrochemistry: the response of an electric double layer capacitor (EDLC) subject to a small, suddenly-applied external potential. We solve the Debye-Falkenhagen equation to obtain exact expressions for key EDLC quantities: the ionic charge density, the ionic current density, and the electric field. In contrast to earlier works, our results are not restricted to the long-time asymptotics of those quantities. The solutions take the form of infinite sums whose successive terms all decay exponentially with increasingly short relaxation times. Importantly, this set of relaxation times is the same among all aforementioned EDLC quantities; this property is demanded on physical grounds, but not generally achieved within approximate schemes. The scaling of the largest relaxation time scale $\tau_{1}$, that determines the long-time decay, is in accordance with earlier results: depending on the Debye length, $\lambda_{D}$, and the electrode separation $L$, it amounts to $\tau_{1}\simeq\lambda_{D} L/D$ for $L\gg\lambda_{D}$, and $\tau_{1} \simeq 4 L^2/(\pi^2 D)$ for $L\ll\lambda_{D}$, respectively (with $D$ being the ionic diffusivity).
Publisher URL: http://arxiv.org/abs/1802.02777
DOI: arXiv:1802.02777v1
Keeping up-to-date with research can feel impossible, with papers being published faster than you'll ever be able to read them. That's where Researcher comes in: we're simplifying discovery and making important discussions happen. With over 19,000 sources, including peer-reviewed journals, preprints, blogs, universities, podcasts and Live events across 10 research areas, you'll never miss what's important to you. It's like social media, but better. Oh, and we should mention - it's free.
Researcher displays publicly available abstracts and doesn’t host any full article content. If the content is open access, we will direct clicks from the abstracts to the publisher website and display the PDF copy on our platform. Clicks to view the full text will be directed to the publisher website, where only users with subscriptions or access through their institution are able to view the full article.