We present a method for the determination of the energy relations of semiconductor/liquid junctions, which are the basis for the successful operation of such renewable solar energy converting systems.
Operando Ambient Pressure X-ray photoelectron spectroscopy (operando AP-XPS) investigation of semiconductor/liquid junctions provides quantitative understanding of the energy bands in these photoelectrochemical solar cells. Liquid junction photoelectrochemical cells allow a uniform contact between the light-absorbing semiconductor and its contacting electrolyte phase. Standard Ultra High Vacuum (UHV) based X-ray photoelectron spectroscopy (XPS) has been used to analyze the electronic energy band relations in solid-state photovoltaics. We demonstrate how operando AP-XPS may be used to determine these relationships for semiconductor/liquid systems. The use of “tender” X-ray synchrotron radiation produces photoelectrons with enough energy to escape through a thin electrolyte overlayer; these photoelectrons provide information regarding the chemical and electronic nature of the top ~10 nm of the electrode as well as of the electrolyte. The data can be analyzed to determine the energy relationship between the electronic energy bands in the semiconductor electrode and the redox levels in the solution. These relationships are critical to the operation of the photoelectrochemical cell and for understanding such processes as photoelectrode corrosion or passivation. Through the approach described herein, the major conditions for semiconductor-electrolyte contacts including accumulation, depletion, and Fermi-level pinning are observed, and the so-called flat-band energy can be determined.
Semiconductor/liquid junctions have long been investigated due to their simplicity of construction and economical possibility of fuel generation 1-4, with some such systems obtaining efficiencies over 17%.5 These systems operate based on the formation of a rectifying junction at the interface between the semiconductor electrode and the electrolyte. The energetics of semiconductor/liquid junctions are similar to those of a semiconductor/metal, Schottky, junction 3 where an electrolyte assumes the role of the metal. The semiconductor Fermi level, EF, is the electrochemical potential of the electron in the semiconductor and is analogous to the chemical potential of an electron in solution. In a liquid junction cell the difference in the chemical potential of the electron between the two phases results in the transfer of charge from one phase to another at equilibrium. Since the ions in the electrolyte are free to move while the fixed charges in the semiconductor cannot, a space-charge (or depletion) region forms within the semiconductor with an accompanying electric field. This electric field shifts the Fermi level (electrochemical potential) of the semiconductor to be equal to the chemical potential of the electron in the solution 6. The resulting electric field in the semiconductor only exists close (~ 1 µm) to the solution interface and the energy of the electron levels in this region are viewed as being "bent" by the field. The "band bending" in the semiconductor space-charge region results in a barrier to current flow in one direction while allowing conduction in the opposite direction, producing a "rectifying junction". Under illumination, this electrical field in the near-surface region of the semiconductor can separate light-generated electrons and holes, such that the device can be operated in a manner analogous to a solid-state photovoltaic device. Figure 1 demonstrates these basic concepts.
Figure 1: Solid/liquid junction. Illustration showing the band diagram and charge carrier density for (a) flat-band, (b) accumulation, (c) depletion and (d) inversion of an n-type semiconductor/liquid junction with ne the free electron concentration, nh the free hole concentration and ni the intrinsic carrier concentration. The width of space-charge region is show as an accumulation layer dacc, a depletion layer ddep or an inversion layer dinv. For further discussion, see 29. Abbreviations are as follows: CBM: Conduction Band Minimum; VBM: Valence Band Maximum; EF: Fermi Energy; U: the applied potential with respect to flat band; UFB the flat band potential; μes- : the chemical potential in the solution as described in reference 23. Please click here to view a larger version of this figure.
X-ray photoelectron spectroscopy (XPS) is a widely-used technique for determining both chemical (i.e., oxidation) states and electronic effects such as energy band relations in solid materials. Because of the very small inelastic mean free path (IMFP) of photoelectrons in air, including IMFPs on the mm scale even at millibar pressures7, and in order to avoid changes of the probed surfaces during measurements, XPS generally has to be performed under ultra-high vacuum (UHV) conditions. Numerous reviews of the XPS technique have been written 8-10. In XPS, typically, electrons from core levels of the constituent elements of the sample are ejected into the vacuum by the absorption of X-rays. Upon irradiation with X-rays of an energy hν, electrons are ejected from the sample having a kinetic energy EKvac with respect to the vacuum level EVAC. Figure 2 shows (a) the general geometry of an XPS instrument, (b) a simulated XPS spectra of TiO2 with core levels (CL), Auger lines and a measurement of the work function, and (c) the relation of photon energy to kinetic and binding energies. The conservation of energy requires
hν = EB + EKvac + φ (1)
where EB is the binding energy of the photoelectron from the core level, and φ is the work function of the sample. EB is referenced to the Fermi level of the sample, EF. The position of EF can be determined by measurement of the valence band maximum of a noble metal (i.e. Gold or Silver) and fitting the Fermi function when the photon energy is well known (i.e. Al Kα). Otherwise this procedure is used to calibrate the photon energy, i.e. at electron synchrotrons that produce X-rays of variable energy.
Figure 2: XPS Schematic. Illustration of the XPS method: (a) standard XPS geometry; (b) Simulated XPS spectra of TiO2 with core levels (CL), Auger lines and work function measurement; (c) Energy band relations for TiO2 and definitions of kinetic energies EKvac, binding energies EB and work function φ. Please click here to view a larger version of this figure.
Recently, ambient-pressure XPS, AP-XPS, experiments have been made possible due to the construction of differentially pumped electrostatic lens equipped ambient-pressure XPS analyzer systems. One approach to doing XPS at a solid/liquid interface is to separate the vacuum and the solution with a thin membrane through which XPS is carried out{Kolmakov, 2011 #176}11-13. This technique requires the use of extremely thin membranes of materials such as silicon or graphene, as opposed to allowing measurements on thicker semiconductor materials. While standard XPS is carried out under UHV (10-9– 10-11 Torr), in AP-XPS the sample is at tens of Torr pressure while the analyzer remains under HV/UHV conditions. The resulting large pressure difference is realized by multiple stages of differential pumping 7,14. As a result, measurement conditions much closer to a normal working environment can be realized. Studies on gold oxidation 15, lithium-oxygen redox reactions 16, and catalytic reactions 17 have been carried out in such systems. Further development and refinement of the technique 18 has allowed use of an electrochemical cell as the sample with the ability to apply a potential difference between the working electrode and the solution in a three-electrode electrochemical cell, which we term operando AP-XPS. The surface of the working electrode under a thin meniscus of electrolyte is analyzed by the operando AP-XPS technique. Figure 3 shows (a) a general schematic of the endstation as well as (b-d) pictures of the various parts of the endstation and (e) the materials under investigation. As a result, the solid working electrode as well as the thin (~13 nm) electrolyte layer can be investigated simultaneously, provided that the photoelectrons have a sufficient kinetic energy to penetrate through the electrolyte overlayer and escape unscattered, i.e. without energy loss, to the analyzer/detector. The use of ~ 4 keV X-rays produces photoelectrons with sufficient kinetic energy (~3.5 keV for Ti 2p and O 1s core levels) to make this possible 18.
Figure 3: Operando AP-XPS setup. (a) Scheme of the operando XPS setup. The working electrode and the hemispherical electron energy analyzer (HEA) were grounded together. The potential of the working electrode was changed with respect to the reference electrode. The PEC-beaker containing the electrolyte could be lowered whereas the three-electrode mount could be moved in all three directions. (b) View into the high-pressure analysis chamber. The X-ray beam enters through the window on the left, the three-electrode setup is on the top, the electrolyte beaker on the bottom, and the electron analyzer cone is in the center. (c) Three-electrode setup pulled up and in measurement position (compare to (a)). (d) Photo of the actual "tender" X-Ray operando AP-XPS analyzer and the analysis chamber that is directly connected to the analyzer. (e) The energy band relations of the p+-Si/TiO2/H2O(l.)/H2O(g.) system under applied potential U. The working electrode (Si) and analyzer are grounded. In the three-electrode configuration the Fermi energy is shifted by U with respect to the reference electrode. The definitions of kinetic energies EKvac, binding energies EB, work function φ and the ionization energy of H2O (g.) EIE are given. For p+-Si/TiO2/Ni/H2O(l.)/H2O(g.) electrodes, a thin film of Ni/NiOx would also be present at the solid/liquid interface, and would influence band bending as discussed in the text. For a further analysis of the importance of the Ni/NiOx film, please see 27. Please click here to view a larger version of this figure.
We have recently demonstrated that the combination of atomic-layer deposition (ALD)-grown TiO2 with a Ni catalyst can effectively stabilize a variety of semiconductors in alkaline media, including Si, GaP, GaAs 19, CdTe 20, and BiVO421 against photocorrosion. This advancement enables the use of technologically advanced semiconductors for energy converting devices such as solar fuel generators. Further investigation of the working principles of TiO2 in these systems was undertaken to evaluate the nature of the semiconductor/liquid junction in the presence or absence of Ni 22-24. Direct observation of these junctions using the operando AP-XPS approach produces data which demonstrate the working principles (accumulation, Fermi level pinning, depletion, inversion) behind these systems. Furthermore, this approach provides a tool by which a semiconductor/liquid junction or photocatalyst25,26 may be interrogated such that the fundamental operating characteristics may be understood and optimized. We describe herein the manner in which such investigations may be undertaken, the conditions that are required for these experiments to work, and the means by which the data collected may be understood. We describe, in sections 1-2, the preparation of the electrodes which were used in our experiments, before presenting more general directions (sections 3-5) regarding the collection of data using this approach.
1. Preparation of Semiconductor for Analysis
Figure 4: ALD. (a) Illustration of one full ALD cycle for the growth of TiO2 on Si/SiO2. (b) Pressure variation in the ALD reactor during one cycle with times of precursor, oxygen, and purging pulses. Please click here to view a larger version of this figure.
2. Construction of Electrodes for the Endstation
3. Preparation of Electrolyte(s) and Materials for Beamline Experiments
4. Photoelectron Spectroscopy Energy Calibration
5. Photoemission Measurement and Data collection
Figure 5: Operando AP-XPS data acquisition. (a) Sample is dipped into the electrolyte, CVs are recorded and the potential U is set. (b) The sample is pulled up and placed in measurement position (while maintaining electrical contact of all three electrodes with the electrolyte). (c) Beam shutter is opened and the measurement spot is illuminated by X-rays. Sample position is corrected, if necessary, and core level spectra are recorded. Please click here to view a larger version of this figure.
Representative results are shown in Figures 6, 7, and 8. Figure 6 shows the collected O 1s and Ti 2p core level spectra for a TiO2 electrolyte in 1.0 M KOH solution, stacked with respect to the applied potential. Figure 7 shows the plotted core level water O 1s and Ti 2p peak positions, as collected from Figure 6 as well as from data in which a TiO2/Ni/electrolyte sample was investigated in the same electrolyte. Figure 8 shows a brief summary of our conclusions from this investigation regarding the nature of the semiconductor/liquid contact.
First, we consider the binding energies of the solid at a semiconductor/liquid or metal/liquid junction. The binding energies for the electrode are measured at the surface of the electrode. For an ideal semiconductor/liquid junction, provided that the space-charge region is significantly thicker than the sampling depth, only the energy bands at the top/edge of the space charge region are probed, i.e. the binding energies are more representative of the interface/surface of the semiconductor than of its bulk properties. In the ideal case, the energy of the band edges (i.e. the energy of the bands at the solution interface) of the semiconductor are fixed with respect to the solution (no potential drop in the electrolyte); as a result, if the Fermi level is moved to a relatively more positive potential by applying a positive potential to the n-type working electrode, the energy difference between the core levels at the semiconductor/electrolyte interface and the Fermi level will decrease accordingly (formation of a depletion layer in the semiconductor at the surface). Thus the binding energy of the semiconductor core levels will change with the applied voltage with a slope of 1 eV V-1 at the semiconductor surface.
For a metal/liquid junction, no band bending can occur since a metal cannot support an electric field within its bulk. Static electric fields are screened within less than an atomic layer by the free electrons of the metal. When a potential is applied across a metal/solution interface, a charge builds up on the surface of the metal that is compensated by an equal and opposite charge in a thin layer of the solution (~1 nm for electrolyte concentration ~1 M). The two layers of charge are known as the electrochemical double layer. This produces an electric field within the double layer, also called the Helmholtz or Stern layer, with the potential solely changing in this region which is about 1 nm thick. This causes the metal energy bands to shift in unison relative to the solution, i.e. the difference between the core level binding energy of the metal to the Fermi level stays constant. Thus the binding energies observed for a metal stay fixed when the applied potential is changed (the slope is now 0 eV V-1), as long as no chemical changes (such as oxidation) occur. For a non-ideal semiconductor junction, the presence of surface defects or chemical interactions with the ambient can result in surface states with a high density of states and an accordingly increased capacitance compared to that of the semiconductor space charge region. This can induce a behavior similar to that of a metal, such that the band edges can shift relative to the solution. In this case, when a potential is applied to the working electrode, the semiconductor bands shift (instead of band bending) and the binding energy does not show a shift with the applied voltage; as a result, the relation of 0 eV V-1 is once again observed. Typical conditions for such band edge shifting are strong accumulation or strong inversion in which the semiconductor is biased negative or positive enough of its flat-band potential for n-type so the Fermi level approaches the conduction band or valence band edges with their high density of states. Band edge shifting can also result from Fermi level pinning at (high density) surface states.
The situation for the binding energies of the bulk water is different. They are measured primarily at the surface of the electrolyte (away from the electrode). When the solution consists of a concentrated electrolyte (> 0.1 M), static electrical fields only exist in the electrochemical double layer; beyond that region, the electrolyte is neutral and the binding energy of the O 1s core level of the bulk water (measured predominantly outside the double layer) is expected to shift with applied potential with a slope of -1 eV V-1, analogous to the ideal semiconductor/liquid band edge shifts as the Fermi level is moved positive with respect to the water core levels, i.e., a positive potential is applied to the working electrode.
The peaks in Figure 6a have been fitted, and their relative peak positions are plotted in Figure 7a. Four different regions of applied potential were defined, based on the observed shifts in binding energy for the TiO2/liquid junction sample. We deduced that in regions with no shift in binding energy for the TiO2, band edge movement occurs; this can occur due to strong semiconductor accumulation where the Fermi level approaches the conduction band of TiO2 at very negative potentials (region U1) or Fermi level pinning 28 at potential regions where mid-gap defect states occur (region U3). In other regions, such as U2 and U4, the binding energy-potential relationship appears effectively ideal and approaches the -1 eV V-1 shift expected. In these regions we conclude that the semiconductor band edges are fixed.
Figure 6: Core-level Operando AP-XPS data. (a) O 1s and Ti 2p core levels of the TiO2/electrolyte electrode. (b) CV curve of the TiO2/electrolyte electrode with arrows indicating the potentials at which XPS spectra were taken. (c) Mott-Schottky data for a p+-Si/TiO2 electrode, with Ufb calculated as -0.9 V vs. Ag/AgCl from a linear fit; a Randles circuit was used as the equivalent circuit. Data is from reference 18 and reproduced by permission of The Royal Society of Chemistry. Please click here to view a larger version of this figure.
The addition of Ni (by 60 s of sputtering) to the surface of the electrode (Figure 7b) markedly changes the relative binding energy shifts with applied voltage. The binding energies in the Ti 2p and Ni 2p data sets for this electrode are nearly constant with respect to applied potential, indicating that the band bending within the semiconductor does not markedly change across this potential range. This suggests that the TiO2/Ni combination acts like a metal when in contact with the electrolyte. As this combination is also highly conductive, these results are consistent with the observed electrochemical behavior of the samples. These results are summarized in Figure 8; we believe this general approach to be appropriate for the investigation of various semiconductor/liquid combinations. Although the Ni film will contain a Ni/NiOx intermixed layer, the distinction here does not alter these conclusions substantially. A more rigorous analysis can be found in 27.
Figure 7: Relative Core-level Peak Shifts. Relative peak shifts with respect to the flat-band potential Ufb = -0.9 V vs. Ag/AgCl for the (a) p+-Si/TiO2 and (b) p+-Si/TiO2/Ni(60 s) electrode of the O 1s (H2O), Ti 2p (TiO2), and Ni (NiOx) core levels. Also presented are full width at half maximum (FWHM) for the Ti 2p3/2 peak of the (c) p+-Si/TiO2 electrode and of the (d) p+Si/TiO2/Ni(60 s) as a function of applied potential. Data is from reference 18 and reproduced by permission of The Royal Society of Chemistry. Please click here to view a larger version of this figure.
Figure 8: Band diagram. Schematic energy diagram of the TiO2/liquid junction. (a) For highly negative bias (U1 region, red lines), band shifting in the TiO2 is observed (< -1.2 V). (b) In the ideal semiconductor region U2, from -0.9 V to -0.6 V (blue lines), band bending in the TiO2 is observed with no further potential drop in the electrochemical double layer. (c) For increased positive biased (U3 region, green lines), the Fermi level is pinned to the defect states, and the TiO2 bands shift with the complete potential drop that occurs in the electrochemical double layer. (d) At potentials positive of -0.2 V (region U4), ideal behavior is once again observed. In all cases, the shift in water O 1s binding energy is linear with the applied voltage. The Ti 2p binding energy shifts linearly for band bending regimes (U2 and U4) and remains constant for the band shifting regimes (U1 and U3). Data is from reference 18 and reproduced by permission of The Royal Society of Chemistry. Please click here to view a larger version of this figure.
A further piece of information that can be extracted from the data collected is the flat-band potential Ufb for a semiconductor/liquid junction. For appropriately doped semiconductors the width of the space-charge region dscr is on the order of a few photoelectron escape depths , i.e. 0.1<dscr/3<10. For this situation, the emitted photoelectrons originate from the band bending region of the electrode and their energy is modified by the course of the band bending with position relative to the outmost semiconductor surface. This rather small variation in energy with position in the semiconductor (band bendings are of the order of a few tenths to 1 electron volt) results in a broadening of the measured core level due to the superposition of the kinetic energies of electrons emitted elastically from different depths. Accordingly, the width of the semiconductor core level peak (here, Ti 2p) broadens with increasing band bending, and is smallest when the band bending is absent, i.e. at the flat-band potential. As a result, plotting the full-width at half-maximum (FWHM) should show a minimum at the flat-band potential. As shown in Figure 7c, this was the case for the representative data collected herein; Mott-Schottky analysis in Figure 6c confirmed that the observed flat-band potential at 0.9 V vs. Ag/AgCl was consistent with investigation by electrochemical methods.
The most critical steps in the technique for data collection are the application of voltage and the collection of the XPS data. The semiconductor preparation is necessarily crucial but can be generalized to any system where the semiconductor/liquid junction is stable enough to be investigated. However, for the choice of electrolyte, a number of experimental parameters must be considered. First, there must be sufficient interaction (hydrophilic or hydrophobic) between the solid electrode and the electrolyte in order to form a thin stable meniscus; hydrophilic samples will generally work with water while hydrophobic samples will more likely work with organic solvents. Further, the electrolyte must not precipitate while under vacuum or due to slight temperature changes, and must have negligible vapor pressure. Precipitates can clog the detection cone. Furthermore, the electrode must not corrode or undergo chemical reactions over the course of the experiments, unless the measurement of such corrosion or reactions is itself the goal of the work.
Because these experiments generally observe the relative changes in binding energies with varied potential as opposed to absolute values of binding energies, the calibration with a gold (or other metal) standard is not absolutely required. However, the absolute binding energy values are also useful as these are informative as to the relative band edge placements of a semiconductor with respect to the solution as well as the orientation of the band edges with respect to other energetic states in the solid of interest. Furthermore, this calibration allows for the collected results to more easily be compared to standard UHV-XPS, in which the calibration is generally carried out prior to any experimentation.
Problems arising within the technique may be generally divided as follows. First, the core level in question must have a sufficiently high intensity in order for data thereof to be collected; if this is not the case, the count rate for the core level might be below the noise level in the data collected. A small photoionization cross section for interaction between the photon beam and the core level in question would lead to such an issue. This can be easily addressed by choosing proper core levels after collecting a survey scan prior to the application of voltages to the system; generally, the core level peak that is most intense for an aluminum Kα – based XPS (standard laboratory instrument) can be easily investigated by this technique as well. Second, the kinetic energy of the photoelectrons should be as high as possible, i.e. their binding energy should be as low as possible. This ensures an IMFP that is high enough to allow probing the semiconductor energy bands below the liquid layer. Third, a clogged photoelectron collection cone is a very common problem and one that is best addressed through prevention; careful movements of the electrodes and beaker setups, as well as slow and cautious approach of the electrodes to the cone, will minimize the amount of solution that might interact with the cone. Care must also be taken to prevent the application of any potential that would cause substantial bubble formation as this can also provide a substantial amount of volatized material which can clog the cone. A clogged cone will result in decreasing count rates which will eventually make data collection impossible and require removal and cleaning of the cone itself, which requires a substantial amount of time (~8 hours). Fourth, the meniscus thickness must ideally be controlled to provide data on both the electrolyte and the solid; however, we have observed that different potentials may result in a thickening or thinning of the solution meniscus. As a result, it may be necessary to vary the potential window for data collection in order to observe photoelectron signals from all the constituents under investigation while maintaining three-electrode contact. A sample that is not sufficiently hydrophilic to maintain a stable meniscus may be made hydrophilic by careful oxidation of the surface; this is best carried out prior to data collection.
This technique, while powerful, has some limitations. Semiconductor and metal stability is important (outside of intentional corrosion studies) and the electrolyte window is limited to non-volatile materials such as KOH whereas liquid additives such as HCl would not be permissible.
The photoionization cross section decreases with increased photon energy and is relatively small for photon energies used in this experiment resulting in an increased data collection time.
Another consideration that must be taken into account is the bandwidth of the incoming photon beam. Monochromators can provide a very high resolving power, with E/ΔE of over 10000, whereas here, E/ΔE = 3000-7200. While this provides reasonable spectral resolution in the lower photon energy range (as used in laboratory XPS) the resolution decreases with increased photon energy, e.g. significant peak broadening can be observed, and fine structures, e.g. the spin orbit split in Si 2p, are not as well resolved. This, however, is only relevant for investigations of systems with numerous energetically close XPS core level peaks. Despite these limitations, however, this technique has substantially more power than standard XPS to resolve chemical changes at solid/liquid interfaces, because standard XPS requires a transfer into the XPS instrument and the application of ultra-high vacuum, during which the electrochemical nature of the material can change substantially. The operando AP-XPS approach furthermore can directly determine the nature of band bending in a semiconductor across a wide potential range, which is not possible using standard XPS on a semiconductor/liquid junction.
Further work using this technique will be applied to a wide variety of systems in which electrolytes and semiconductors, relevant for photoelectrochemical energy research, will be investigated. Corrosion analysis may be done directly with this methodology as opposed to the use of ex-situ analysis. Other semiconductor systems, particularly those relevant to the field of solar energy conversion such as transition metal oxides or technologically advanced group III-V and II-VI semiconductors are exciting systems for operando AP-XPS analysis. In particular, the influence of catalyst deposition on semiconductor energetics may be characterized. Systems such as crystalline SrTiO3, BiVO4 or InP, GaAs and ZnO can be considered as model systems for such work.
In conclusion, operando AP-XPS investigations of semiconductor/liquid junctions allow for the description of the energetics at the interface and the nature of the junction. The type and magnitude of the band bending, accumulation, depletion, and inversion can be characterized as well as Fermi-level pinning and other attributes. While we only present data for TiO2 and TiO2/Ni in KOH electrolyte here, this approach can work for any semiconductor/liquid system that is consistent with the requirements presented in the above discussion section.
The authors have nothing to disclose.
This work was supported through the Office of Science of the U.S. Department of Energy (DOE) under award No. DE SC0004993 to the Joint Center for Artificial Photosynthesis, a DOE Energy Innovation Hub. The Advanced Light Source is supported by the Director, Office of Science, Office of Basic Energy Sciences, of the U.S. Department of Energy under Contract No. DE AC02 05CH11231. The authors thank Dr. Philip Ross for contributions to the conceptual development of the operando AP-XPS endstation and experimental design.
p+-Si(100) | Addison | 3P-111 | Resistivity < 0.005 Ω – cm |
H2SO4 | Sigma Aldrich | 339741 | 99.999% |
H2O2 | Sigma Aldrich | 216763 | 30% |
HF | Sigma Aldrich | 339261 | 99.99% |
millipore H2O | EMDMillipore | Milli-Q® Advantage A10 | 18.2 MΩ |
HCl | Sigma Aldrich | 320331 | ACS Reagent, 37% |
Tetrakis(dimethylamido)titanium(IV) (TDMAT) | Sigma Aldrich | 469858 | 99.999% |
N2 | Praxair | NI 6.0 RS | >99.9999% |
Ni target | AJA International | 7440-02-0 | >99.99% |
In/Ga | Sigma Aldrich | 495425 | >99.99% |
Hysol 9460 | Ellsworth Adhesives | 83128 | Dual cartridge |
KOH | Sigma Aldrich | 306568 | Semiconductor grade, 99.99% |
Liquid Nitrogen | Praxair | NI 5.0 | |
Gold foil | Sigma Aldrich | 326496 | 99.99% |
HNO3 | Sigma Aldrich | 438073 | ACS Reagent, 70% |
1-sided copper tape | adafruit | 1128 | For electrode construction |
glass microscope slides | VWR | 48300-025 | For electrode construction |
Ag/AgCl reference electrode | eDaq | ET072-1 | |
Platinum foil | Sigma Aldrich | 349348 | 99.99% |
SP-300 Biologic Potentiostat | Biologic | SP-300 | |
Scienta r4000 HiPP-2 Detector APPES | Scienta | HiPP-2 |
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