Cyclic Staircase versus Cyclic Voltammetry for Reversible Electron Transfer Reaction

​
redox reaction
O + e ⟷ R
δξ
0.4
γ
0.5
This Demonstration models the voltammetric response (black dots) for a reversible electron transfer reaction taking place at the surface of a planar macroelectrode, with cyclic staircase perturbation of the electrode potential (black staircase in the inset). The sampled staircase voltammetric response (black dots) is compared to the electrode response (orange line) obtained by application of a cyclic potential ramp (orange line in the inset). The model assumes semi-infinite diffusion of redox species normal to the electrode surface. You can experiment with the effects of the amplitude of potential step for the staircase signal, and the sampling condition for evaluation of the current response, using the controls for the dimensionless parameters
δξ
and
γ
. The plots show the dimensionless current density
ψ
as a function of the dimensionless potential
ξ
. The relative deviations
ϵ
ψ
for the peak forward (pf) and peak reverse (pr) reactions for the two voltammograms are displayed, as well as the mean squared deviation (MSD).

Details

Cyclic voltammetry (CV) is widely used for investigating electrochemical reactions[1]. The input signal for CV is a sawtooth potential signal, with slope (scan rate)
±v
. Computer-controlled digital instruments cannot apply true linear ramps. A staircase potential signal is employed in practice, which results in the cyclic staircase voltammetry (CSCV) technique. Each potential step of the staircase signal involves three parameters: the amplitude
δE
, the time interval
δt
following the potential step and the time
γδt
where the current is sampled/measured. The parameter
γ∈[0,1]
is the sampling ratio for CSCV. The staircase signal results in a formal potential scan rate,
v=δE/δt
. A general theory for pulse voltammetry techniques, and in particular for CSCV, can be found in[2].
The Demonstration focuses on the electrochemical reaction,
O+e↔R
, involving two soluble species. The model assumes reversible electron transfer kinetics at the electrode surface and semi-infinite linear diffusion of redox species in the electrolyte. The species
R
is absent at the initial time. The CV response is the orange line. The CSCV response sampled at
t=(n+γ-1)δt
, for
n=1,2,…
, is shown by the black dots. The graphical inset shows the first steps of the staircase signal, together with the sampling times (dots) and the linear potential ramp (orange line) with slope
δE/δt
. Dimensionless notation is used for the electrode potential
ξ=f(E-
o
E
)
, the current density
ψ=j/F
*
c
O
fv
D
O
, and the amplitude of the potential step
δξ=fδE
for the CSCV technique. Here
o
E
is the standard potential of redox couple,
*
c
O
is the initial concentration of reactant,
D
O
is its diffusion coefficient and
f=F/RT
is the Nernst constant,
F
,
R
and
T
having their usual meaning. By way of illustration, setting
δξ=0.2
, the potential step amplitude is
δE=5.14mV
at 25 °C, and the time length following each potential step is
δt=δE/v
.
The main purpose of this Demonstration is to exhibit the optimal sampling condition that guarantees the equivalence of CSCV and CV current data within an acceptable error. Two criteria are used here: first, the relative deviation (
ϵ
) between the voltammetric peak (subscript
p
) currents for the forward (subscript
f
) and backward (subscript
b
) potential scans, and second, the mean squared deviation (MSD) between the two voltammograms. Computational details can be found in[3].

References

[1] A. J. Bard and L. R. Faulkner, Electrochemical Methods: Fundamentals and Applications, 2nd ed., New York: Wiley, 2001.
[2] Á. Molina, and J. González, Pulse Voltammetry in Physical Electrochemistry and Electroanalysis: Theory and Applications, Cham: Springer International Publishing Switzerland, 2016.
[3] C. Montella, "Further Investigation of the Equivalence of Staircase and Linear Scan Voltammograms. I- Sampling Conditions for Reversible Reactions Involving Soluble Species," Journal of Electroanalytical Chemistry, 796, 2017 pp. 96–107. doi:10.1016/j.jelechem.2017.04.048.

Permanent Citation

Claude Montella, Jean-Paul Diard
​
​"Cyclic Staircase versus Cyclic Voltammetry for Reversible Electron Transfer Reaction"​
​http://demonstrations.wolfram.com/CyclicStaircaseVersusCyclicVoltammetryForReversibleElectronT/​
​Wolfram Demonstrations Project​
​Published: July 6, 2017