Recent progress in the synthesis of monolayer MoS2, a two-dimensional direct band-gap semiconductor, is paving new pathways toward atomically thin electronics. Despite the large amount of literature, fundamental gaps remain in understanding electronic properties at the nanoscale. Here, we report a study of highly crystalline islands of MoS2 grown via a refined chemical vapor deposition synthesis technique. Using high resolution scanning tunneling microscopy and spectroscopy (STM/STS), photoemission electron microscopy/spectroscopy (PEEM) and μ-ARPES we investigate the electronic properties of MoS2 as a function of the number of layers at the nanoscale and show in-depth how the band gap is affected by a shift of the valence band edge as a function of the layer number. Green’s function based electronic structure calculations were carried out in order to shed light on the mechanism underlying the observed bandgap reduction with increasing thickness, and the role of the interfacial Sulphur atoms is clarified. Our study, which gives new insight into the variation of electronic properties of MoS2 films with thickness bears directly on junction properties of MoS2, and thus impacts electronics application of MoS2.
Two-dimensional (2D) materials have recently attracted attention for their potential applications in electronics and optoelectronics devices. Although graphene is the workhorse 2D material1 for the richness of physics that it displays2,3 and its high carrier mobility4, the lack of a bandgap limits its application in the semiconducting industry. 2D transition metal dichalcogenides (TMDs), with the general formula MX2 (where M = Mo, W; X = Se, S, Te) are layered materials typically composed of planar sheets with strong in-plane bonds and with layers weakly bound by van der Waals interactions, facilitating the isolation of single or few layers similar to graphene. In the bulk form the physical properties of TMDs are diverse ranging from insulators such as HfS2, to semiconductors such as MoS2 and WS2, to semimetals such as WTe2 and TiSe2, and to true metals such as NbSe2 and VSe2. Their phase diagrams under temperature, doping and pressure are very rich, and display instabilities like charge density waves with commensurate, incommensurate, short-range correlations and chiral order5,6,7,8, superconductivity9, excitonic condensation10 and Mott-insulator transitions11. More remarkably, their properties at the level of a monolayer or a few atomic layers can be strongly modified. In the case of MoS2, there is a transition from an indirect band gap in the bulk to a direct band gap at monolayer12 that can be tuned by functionalization or purposeful tweaking, opening up the possibility of flexible electronics applications13,14 and field effect transistors15,16. Unlike graphene, monolayer MoS2 lacks spatial inversion symmetry and has strong spin-orbit coupling originating from the d-orbitals of the heavy transition metal atom. This coupled with a large direct band gap induces spin-split valence bands around the K-point17, making MoS2 a promising material for spin/valley electronics.
Among the most interesting properties of 2D-TMDs is the tunability of the electronic properties as a function of layer thickness18,19, stress20,21, defects such as vacancies, and doping and intercalation12,22,23,24. Several studies have been performed on atomically thin TMDs to characterize their electronic and structural properties. A majority of these studies include photoluminescence experiments to determine optical bandgaps12,20,21,25 and high-resolution transmission microscopy to determine the crystal structure26,27,28. Other advanced surface science techniques such as angle-resolved photoemission spectroscopy (ARPES)18 and STM/STS29,30,31 have been used to probe the electronic properties of 2D TMDs. However, due to the stringent requirements of high-quality samples with large single-crystalline domains, high uniformity, clean, atomically flat and conductive substrates, there is paucity of high-quality STM/STS data on intrinsic electronic properties of MX2 layers at the atomic scale.
In this work we report a systematic study of the evolution of electronic properties of ultrathin MoS2 films as a function of layer number. We employ a comprehensive approach, which combines STM/STS, PEEM and μ-ARPES measurements. In this way we address nanoscale properties of MoS2 and adduce fundamental information relevant for applications. The MoS2 samples were directly grown on a graphite substrate by the chemical vapour deposition (CVD) method32 to avoid contamination introduced by chemical transfer. The layer-dependent tunneling and PEEM spectra are modeled using Green’s function techniques within a tight-binding (TB) framework utilizing density functional theory (DFT) to unfold the mechanism responsible for producing reduction in the bandgap with film thickness.
Structural and scanning tunneling microscopy/spectroscopy characterization
STM/STS allows us to measure the intrinsic one-electron quasiparticle gap and correlate it with the local environment at the atomic scale. The vulnerability of atomically thin layers of 2D materials to environmental disturbances has prompted an ongoing search for substrates that can support the material without perturbing its electronic structure. Graphite substrates are found to be by far the least invasive, making it possible to access the intrinsic low-energy spectrum of 2D materials via STM/STS33,34.
Few layer MoS2 films were prepared using the ambient pressure chemical vapor deposition (APCVD) technique on highly oriented pyrolytic graphite (HOPG) substrates with solid MoO3 and S precursors32. This technique yields highly crystalline, stacked single-layer MoS2 domains as revealed by atomic force microscopy (AFM) (Fig. 1). The AFM images show typical film morphologies that vary between triangular and hexagonal structures as a consequence of the crystal structure of MoS2. In literature, it has been suggested that the triangular morphologies form as a result of the off-stoichiometric, local growth conditions that might cause the edges terminated by Mo (S), for example, to grow faster than those terminated by S (Mo)35. In this scenario, when Mo/S ratio corresponds to the stoichiometry of MoS2, the termination stability and the probability for the formation of two types of terminations would be similar, and this would result in similar growth rates that lead to hexagonal domains. The parallel edges of stacked MoS2 structures, in the samples studied, indicate that the vertical layers tend to grow with little lattice rotation between them.
The films prepared ex-situ were degassed at about 300 °C for about 10 hours in ultra-high vacuum to obtain clean surfaces suitable for STM investigation, and subsequently moved to the STM chamber without breaking the vacuum and cooled down at 4.2 K. Figure 2(a) and (b) show typical large-scale STM topographies of stacked MoS2 hexagonal sheets on HOPG. We find a uniform step height of the MoS2 islands of 0.7 nm, consistent with the c-axis lattice parameter of a single unit cell of MoS232. Atomic resolution STM image taken on the substrate is shown in Fig. 2(c) where the lattice constant is determined to be 2.46 ± 0.02 Å in good agreement with the lattice parameter of HOPG31,36. Figure 2(d) shows an atomic resolution image acquired on monolayer MoS2 where the lattice constant is 3.13 ± 0.03 Å, in agreement with literature values31,36. We find that the atomic resolution image on the first layer MoS2 exhibits a superlattice structure (Moiré pattern), which results from lattice mismatch between the MoS2 film and the underlying HOPG. Occasionally, the S-S direction of the MoS2 is also rotated with respect to the underlying HOPG, as shown on Fig. 2(d). The fast Fourier transform shows inner peaks forming a hexagon (highlighted in blue in the inset of Fig. 2(d)) at an angle of 18° with respect to the primary peaks of the atomic lattice (white hexagon in the inset of Fig. 2(d)). This is consistent with the S-S direction of the MoS2 rotated by an angle of 11° with respect to the underlying HOPG lattice, as depicted in the schematic of Fig. 2(e).
In order to elucidate the thickness dependent electronic properties of MoS2, local STS measurements were performed on the first three layers in Fig. 2(a) and (b). The points at which the spectra were taken were carefully selected to be far from defect sites as well as the edges. The dI/dV curves shown in Fig. 2(f) were obtained by averaging 30 I-V curves per point before taking the derivative numerically. Several points per layer were then averaged. The edge of the valence band maximum (VBM) on the first MoS2 layer is located at 1.79 eV below the Fermi level (EF), and the conduction band minimum (CBM) is located at 0.27 eV above the EF, thereby yielding an intrinsic one-electron quasiparticle bandgap of 2.06 eV. The asymmetry of the spectra about EF suggests that our films are n-doped, which is typical of films fabricated by CVD29,31,37. The spectra show a reduction of the band gap as the thickness increases. This reduction is mostly due to a shift of the valence band edge from −1.79 eV to −1.62 eV from the monolayer to the bilayer, while the transition from two to three layers presents a more subtle decrease. The conduction band edge remains fixed at +0.27 ±0.05 eV.
It has been reported from ARPES experiments and DFT calculations that the direct to indirect band gap transition occurs as a result of the valence band maximum shifting from the K-point to the Γ-point as the thickness is increased from one to two monolayers18. A change of the electronic band structure of atomically thin layers of MoS2 has also been reported and explained in terms of local strain20,38. We can exclude that the bandgap change obtained in STS measurements is due to local strain, as we do not observe a local change in the lattice parameter within our experimental resolution of about 1%. Any change in the lattice parameter below 1% could not account for the observed shift in the valence band edge of 0.17 eV. Our results are in very good agreement with the band structure calculations described below.
X-ray photoemission spectromicroscopy and μ -ARPES.
In order to investigate the spatially- and momentum-resolved valence-band electronic structure of the single- and double-layer MoS2 islands on HOPG, we utilized kinetic-energy-filtered x-ray photoemission microscopy (XPEEM) and micro-angle-resolved photoemission spectroscopy (μ-ARPES) at the UE49-PGM-a beamline at the BESSY-II storage ring (Helmholtz Zentrum Berlin). Figure 3(a) shows an XPEEM image acquired with the photon energy of 100 eV via valence-band photoelectron imaging at the binding energy of 1.8 eV, which corresponds to the rising edge of the valence-band maximum (VBM) of MoS2. A clear contrast between the single- and double-layer MoS2 islands at locations A and B is observed at this binding energy due to the difference in the bandgap size, which is evidenced by the 0.15 eV shift of the VBM towards the EF in Fig. 3(b) and (c), as discussed below.
Location-resolved angle-integrated valence-band photoemission spectra collected at locations A and B with spatial resolution of <40 nm are shown in Fig. 3(b). These spectra provide a direct measure of the matrix-element-weighted density of states of the single- and double-layer MoS2 without detectable contribution from the HOPG substrate, which was measured separately at location C (shown in red). The absolute values of the VBM energies, determined within the uncertainty due to the combined beamline and analyzer resolution as well as the energy calibration, are in good agreement with the STS data.
Angle-resolved μ-ARPES spectra were measured along the Γ-M high-symmetry direction at the locations labeled Area 1 and 2 in Fig. 3(a) with spatial resolution of approximately 5 μm. These measurements provide complementary momentum-resolved information regarding the electronic structure of the single- and double-layer MoS2 islands, which is not accessible via STS and angle-integrated photoemission spectroscopy. Resulting second-derivative images containing spectral contributions from both the MoS2 islands as well as the HOPG substrate are shown in Fig. 3(c) and agree well with prior studies39,40. The hybridized Mo-dz2 and S-pz states centered at the binding energy of approximately 2.3 eV straddle the Γ-point, and a clear shift of the VBM towards the EF is observed for the double-layer MoS2 bands, in excellent agreement with our band-structure calculations described below. Measurement at the K point of the Brillouin zone is obscured by the intense π bands of the surrounding HOPG substrate39,40 and for this reason is not shown.
Theoretical modeling and analysis
The computational studies of scanning tunneling spectroscopy/microscopy (STS/STM) and XPEEM/μ-ARPES experiments were performed within the framework of a realistic, Slater-Koster type tight-binding (TB) model Hamiltonian in which the overlap amplitudes were obtained through fits to first-principles band structures of one- and several-layer thick MoS2 films using WANNIER9041 and VASP codes42,43. Our TB Hamiltonian faithfully reproduces dispersions of ab initio valence and conduction bands and the associated wave functions and orbital characters. Special care was taken to ensure that our TB Hamiltonian correctly captures the evolution of the dispersions, orbital characters and spin-splittings around the VBM and the conduction band minimum (CBM) as the film transitions from a direct to an indirect gap with increasing thickness (Fig. 4(e–g)).
Our basic building block for modeling the geometry of the system is the two-dimensional (2D) primitive cell of a single MoS2 layer, which contains one Mo and two S atoms. An ABA stacking is used to construct multiple layers as shown in Fig. 4(a) for a three-layer film. Note that the environment of the surface S atoms (S1) differs from that of the interfacial S atoms (S2 and S3). Two spin degrees of freedom are included for each orbital with S atoms modeled with one s-orbital and three p-orbitals, and Mo with one s-orbital and five d-orbitals. As a result, our unit cell has 2 × 14, 2 × 28 and 2 × 42 total orbitals in 1, 2 and 3 layer MoS2 films, respectively. While these primitive cells are adequate for band structure calculations and orbital projections, a simulation cell of 4 × 4 unit cells was used in STM/STS calculations in order to model an adequately wide scanning area.
where ∈α is the onsite energy of orbital α, σ is the spin index and Vαβ is the hopping integral between orbitals α and β. For interlayer interactions we use slightly weakened hopping integrals to better model the three-layer film. HSOC takes into account spin-orbit coupling (SOC) between the onsite Mo d-orbitals; the much weaker SOC of S atoms is neglected. The form of
follows that of ref. 46, where L denotes angular momentum. We fit the only parameter α in Eq. (2) to reproduce the spin-orbit splitting of the ab-initio band structure.
The computation of the STS/STM spectra and interpretation of XPEEM results requires the construction of the Green’s function based on the Hamiltonian of Eq. (1). Many-body and external interactions can then be included in the form of self-energy matrices, Σ47,48,49,50,51:
In the present calculations, we make the simplest possible approximation for an inelastic background, and use a term ∑ = −iη, where η is a small (real) positive parameter.
The Green’s function matrix of Eq. (3) is used to derive the density matrix:
The matrix elements, ρασβσ(E,k), of the density matrix are the key quantities that enter the computation of the spin/orbital projections of states and STM/STS spectra. In Fig. 4(b,c) and Fig. 5, the orbital projections are obtained by plotting the density matrix elements of given orbitals as a function of energy and momentum. In STM calculations, we assume that the HOPG substrate does not significantly affect the electronic structure of the MoS2 overlayers, and can therefore be neglected. The differential conductance between the tip and the sample is then given by52,53
where ρ is the electron density matrix and Vts is the hopping integral between a tip orbital t and a sample orbital s. The local density of states (LDOS) of the tip is assumed constant as is appropriate for an s-wave tip. This approach is related to the Tersoff-Hamann approximation54, and it has been used extensively in our earlier publications51,55,56. We turn now to interpret the experimental STS spectra in the light of our computations. A comparison of Figs 2(e) and 4(d) shows that the simulated dI/dV spectra follow the experimentally observed trends strikingly well. In particular, in both theory and experiment, increasing film thickness shifts the top of the valence band upward, while the bottom of the conduction band remains intact, and as a result, the band gap decreases. Insight is provided by our band structure computations, which indicate that the nature of the band gap changes abruptly as we go from one to two layer MoS2 film. In the one layer system, the band gap is direct at the K-point, but for two or more layers, the band gap becomes indirect as the valence bands move to higher energies at Γ-point, see Fig. 4(e–g).
The fundamental mechanism responsible for the dependence of the spectral gap on layer thickness becomes obvious when we consider contributions of different orbitals to the electronic states in the vicinity of the EF, see Fig. 5. In the one-layer film, the maximum of the valence band at the K point has a distinct Mo dxy and dx2−y2 orbital character, while the states at the Γ-point have a strong Mo dz2-character mixed with S-pz orbitals. In the two-layer system, on the other hand, the orbitals of interfacial S atoms overlap with each other, making the states at Γ-point rehybridize. These results are in accord with the tight-binding analysis of Cappeluti et al.57, who analyzed the orbital character/symmetry of interlayer hopping between the layers. Our computations give further insight into how interlayer overlap is reflected to the measured spectra as follows. The surface and interface S atoms contribute to different bands: the top of the valence band at the Γ-point now originates from the interfacial S and the adjoining Mo atoms, while the surface S atoms contribute only weakly to the top of the valence band. As a result the associated states essentially follow the dispersion of the valence band in the one-layer case, see Fig. 4(b) and (c). Although STS measurements do not directly probe the momentum dependence of the electronic spectrum, some information can be adduced from the nature and size of the band gap seen in the differential conductance spectrum (Fig. 4(d)). Since the tunneling current depends on the overlap Vts between the tip and surface orbitals (see Equation 5), we expect that the tunneling matrix element between the valence states at the K-point and the tip will be relatively small compared to that for states at the Γ-point. The reason is that the Mo dx2−y2 and dxy orbitals, which are characteristic of the states at K, are not as extended in the out-of-the-surface direction as the Mo-dz2 and S-pz orbitals, which dominate the VBM states at the Γ-point. This qualitative analysis based on the symmetry of the atomic orbitals suggests that the measured valence band edges in the STS spectra here predominantly originate from the Γ-point.
For analyzing XPEEM and μ-ARPES experiments, we utilize density matrix as projected on the topmost S-layer and the Mo layer lying below the S-layer. We consider two different presentations of the density matrix derived from the Green’s function: 1) for the momentum-resolved μ-ARPES, we analyze the energy-momentum map of the density matrix projected on the two topmost atomic layers; 2) For angle-integrated XPEEM, a similar orbital projection of the LDOS is considered. More specifically, the LDOS-spectra are projected on to the d-orbitals of Mo and the p-orbitals of S on the two top layers. The orbital-projected band diagrams of Fig. 4 (b) and (c) indicate that the experimentally found shift of the VBM as we go from 1 ML to 2 ML originates from the intermediate S atoms. Note that the LDOS associated with the topmost S layer is small at the VBM, indicating that the dz2-orbitals of Mo play an important role mediated by the effects of the interlayer coupling.
In addition to the broadening of the VBM states at the Γ-point for increasing layer thickness, we have characterized features of the integrated XPEEM spectra by looking at the layer-resolved LDOS. While the peaks closest to the VBM display the strong d-character of Mo, there is a relatively wide energy range over which the spectral features are dominated by the p-character of S (see Fig. 4 (h)).
In order to gain insight into the μ-ARPES spectra, it is useful to classify the d-orbitals of Mo in terms of the absolute value of the magnetic quantum numbers, |ml|. Orbitals with |ml| = 1 give little contribution to valence bands, the |ml| = 2 orbitals strongly contribute to the spin-orbit-split states at the K-point, while the |ml| = 0 orbital is mainly responsible for the top of the valence band at the Γ-point. As already noted above, for the 1 ML film, the VBM lies at the K-point, but it moves to the Γ-point as the number of layers increases. In this connection, Fig. 5 shows |ml| = 0 ((c), (f), (I)) and |ml| = 2 ((b), (e), (h)) contributions to the band structure from Mo-dx2−y2 and Mo-dz2 orbitals. Figure 5 (d) and (e) show that the Γ-point signal indeed originates from dz2-orbitals of Mo, and less so from pz of S. In contrast, Fig. 5 (e) and (f) indicate that the states around the K-point possess a stronger dx2−y2 compared to dz2 character.
Finally, Fig. 6 considers real space cross-sections at two different energies to gain a handle on the spatial distribution of the states related to spectral peaks in the XPEEM spectra. We see from Fig. 6 that the high amplitude states at −1.10 eV with p-character are less localized on the S-layers compared to the Mo layers and the space between the layers. At the higher binding energy of 2.90 eV (left panel in Fig. 6), the states are also mainly localized in the Mo layers, but there is also a significant spectral intensity at the interlayer space, which would make the related spectral features more susceptible to substrate effects.
In this high-resolution STM/STS study, we have investigated the intrinsic electronic properties of atomically thin MoS2 layers directly grown on a graphite surface using the APCVD technique. The electronic band gap of the single layer MoS2 is determined to be 2.06 eV by STS spectra taken at 4.2 K, and it is suppressed by approximately 0.17 eV in the bilayer. The bandgap decrease is mostly due to a valence-band-edge shift as confirmed by photoemission microscopy and μ-ARPES measurements on the same samples. Parallel computational modeling of the electronic structure of the films and the associated STS spectra reveals that the interfacial S atoms are mainly responsible for the change in band structure and the observed shift of the valence band edge. Our study provides a comprehensive understanding of the intrinsic electronic properties of 2D TMD materials and impacts the development of new possibilities for electronic applications that utilize the control of two-dimensional layer thickness.
Mono- to few-layer thick MoS2 islands were grown using the well-known ambient pressure chemical vapor deposition technique using ultra-high-purity N2 (250sccm) as the carrier gas. HOPG substrates were cleaved with scotch tape just prior to loading in the furnace. Substrates were suspended facedown above ~15 mg of MoO3 (≥99.5% Sigma Aldrich) in a crucible placed downstream from a different crucible containing 80 mg of Sulfur (≥99.5% Sigma Aldrich). Each crucible was placed in a different heating zone in a 1” furnace. Temperatures in these two zones were individually controlled using two adjacent tube furnaces. The furnace containing the MoO3 and HOPG was degassed at 150 °C for 90 minutes then ramped to 700 °C at a rate of 15 °C/min. Once this furnace reached 320 °C the furnace containing the Sulfur crucible was ramped to 120 °C at approximately 3 °C/min. Both furnaces were allowed to sit at their maximum temperatures for 30 minutes at which point the MoO3 furnace was ramped down at 8 °C/min. Once this furnace reached 580 °C both furnaces were rapidly cooled to room temperature.
Scanning tunneling microscopy and spectroscopy measurements were carried out using a Unisoku STM with PtIr tip at T = 4.2 K in an ultra-high vacuum (<10−11 Torr) at T = 4.2 K. Prior to measurements all samples were degassed at approximately 300 °C and 10−10. Torr for a minimum of three hours up to ten hours and subsequently moved to the scanner without breaking the vacuum. The STM images were recorded in constant current mode with tunneling current of 10–250 pA. For the dI/dV spectra an average of 30 I-V curves were acquired at each location, and curves from different locations within the same layer were averaged to obtain the dI/dV conductance spectra by numerical derivative.
XPEEM and μ-ARPES
X-ray photoemission spectromicroscopy and μ-ARPES measurements were performed at the SPEEM station located at the UE49/PGMa beamline at BESSY-II (Helmholtz Zentrum, Berlin). The instrument is based on the Elmitec III photoemission electron microscope with an integrated electrostatic photoelectron energy analyzer between the objective column and the projective lenses. The analyzer functions as the kinetic energy filter thereby enabling spectromicroscopic imaging via core-level and valence-band photoelectrons, which was the key capability utilized in this study. The photon energy was fixed at 100 eV and the analyzer energy was varied across the range corresponding to the MoS2 valence-band manifold. Typical lateral resolution facilitated by the instrument in the PEEM mode is 30 nm. An aperture in the first image plane of the microscope was used to select the location on the sample for angle-resolved valence-band spectroscopy (μ-ARPES) measurements. The minimum size of the selected area is approximately 5 μm, which defines the spatial resolution in the μ-ARPES mode. Prior to the measurement, the sample was annealed in-situ at 300 °C for 3 hours in order to eliminate surface adsorbates. All measurements were carried out at 20 K.
Atomic force microscopy images were acquired in tapping mode using a Veeco Dimension Icon SPM with an Antimony (n) doped Si tip having a nominal tip radius of 10 nm (Veeco, NCHV). In this mode, the cantilever is driven to oscillate at its resonance frequency of 320 Hz by applying an AC voltage to the z-piezo. As long as the tip is far away from the sample, no interaction is recorded and the oscillation amplitude remains constant. Once the cantilever is moved closer to the sample, the tip starts touching the surface intermittently. As a consequence, changes in the cantilever oscillation amplitude are induced by the Van der Waals interaction. In such a scenario, the amplitude modulations recorded while scanning on the surface are caused by the sample roughness. Here, a feedback loop is used to fix the tip-sample separation point-by-point in order to keep the amplitude constant. The adjustments in tip-sample distance, driven by the feedback loop, are thus a measure of sample topography. AFM measurements were carried out under ambient conditions.
†E.R. Caianiello Physics Department and NANOMATES, Research Centre for Nanomaterials and Nanotechnology, University of Salerno, Fisciano (SA), Italy.
How to cite this article: Trainer, D. J. et al. Inter-Layer Coupling Induced Valence Band Edge Shift in Mono- to Few-Layer MoS2. Sci. Rep. 7, 40559; doi: 10.1038/srep40559 (2017).
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Novosolev, K. S. et al. Electric Field Effect in Atomically Thin Carbon Films. Science 306, 666–669 (2004).
Novosolev, K. S. et al. Two-Dimensional Gas of Massless Dirac Fermions in Graphene. Nature 438, 197 (2005).
Du, X., Skachko, I., Duerr, F., Luican & A. Andrei E. Y. Fractional quantum Hall effect and insulating phase of Dirac electrons in graphene. Nature 462, 192 (2009).
Bolotin, K. I. et al. Ultrathin Electron Mobility in Suspended Graphene. Solid State Commun. 146, 351 (2008).
McMillan, W. L. Landau Theory of Charge Density Waves in Transition Metal Dichalcogenides. Phys. Rev. B 12, 1187 (1975).
Chatterjee, U. et al. Emergence of coherence in the charge-density wave state of 2H-NbSe2. Nature Communications 6, 6313–6319 (2015).
Ishioka, J. et al. Chiral Behavior in 2D transition Metal Dichalcogenides. Phys. Rev. Lett. 105, 176401 (2010).
Iavarone, M. et al. Evolution of the charge density wave state in CuxTiSe2 . Phys. Rev. B 85, 155103 (2012).
Castro Neto, A. H. Charge Density Wave, Superconductivity and Anomalous Metallic Behavior in 2D Transition Metal Dichalcogenides. Phys. Rev. Lett. 86, 4382 (2001).
Monney, C. et al. Spontaneous Exciton Condensation in 1T-TiSe2:BCS-like Approach. Phys. Rev. B 79, 045116 (2009).
Sipos, B. et al. From Mott State to Superconductivity in 1T-TaS2 . Nature Materials 7, 960 (2008).
Mak, K. F., Lee, C., Hone, J., Shan, J. & Heinz, T. F. Atomically Thin MoS2: A New Direct-Gap Semiconductor. Phys. Rev. Lett. 105, 136805 (2010).
Wang, Q. H., Kalantar-Zadeh, K., Kis, A., Coleman, J. N. & Strano, M. S. Electronics and Optoelectronics of Two-Dimensional Transition Metal Dichalcogenides. Nat. Nanotechnol. 7, 699–712 (2012).
Radisavljevic, B., Whitwick, M. B. & Kis, A. Integrated Circuits and Logic Operations Based on Single-Layer MoS2 . ACS Nano 5, 9934–9938 (2011).
Radisavljevic, B., Radenovic, A., Brivio, J., Giacometti, V. & Kis, A. Single-Layer MoS2 Transistors. Nat. Nanotechnol. 6, 147–150 (2011).
Yin, Z. et al. Single-Layer MoS2 PhottTransistors. ACS Nano 6, 74–80 (2011).
Chang, T.-R., Lin, H., Jeng, H.-T. & Bansil, A. Thickness dependence of spin polarization and electronic structure of ultra-thin films of MoS2 and related transition-metal dichalcogenides. Scientific Reports 4, 6270–6274 (2014).
Jin, W. et al. Direct Measurements of the Thickness Dependent Electronic Band Structure of MoS2 Using Angle-Resolved Photoemission Spectroscopy. Phys. Rev. Lett. 111, 106801 (2013).
Komsa, H.-P. & Krasheninnikov, A. V. Effects of confinement and environment on the electronic structure and exciton binding energy of MoS2 from first principles. Phys. Rev. B 86, 241201 (2012).
Castellanos-Gomez, A. et al. Local Strain Engineering in Atomically Thin MoS2. Nano Lett. 13, 5361–5366 (2013).
Conley, H. J. et al. Bandgap Engineering of Strained Monolayer and Bilayer MoS2. Nano Lett. 13, 3626–3630 (2013).
Fuhr, J., Saúl, A. & Sofo, J. Scanning tunneling microscopy chemical signature of point defects on the MoS2 (0001) surface. Phys. Rev. Lett. 92, 026802 (2004).
Zhou, W. et al. Intrinsic Structural Defects in Monolayer Molybdenum Disulfide. Nano Lett. 13, 2615–2622 (2013).
Yue, Q., Chang, S., Qin, S. & Li, J. Functionalization of monolayer Mos2 by substitutional doping: a first-principles study. Phys. Lett. A 377, 1362–1367 (2013).
Eda, G. et al. Photoluminescence from Chemically Exfoliated MoS2. Nano Lett. 11, 5111–5116 (2011).
Lin, Y.-C., Dumcenco, D. O., Huang, Y.-S. & Suenaga, K. Atomic Mechanism of the Semiconducting-to-Metallic Phase Transition in Single-Layered MoS2. Nat. Nanotechnol. 9, 391–396 (2014).
Najmaei, S. et al. Vapour Phase Growth and Grain Boundary Structure of Molybdenum Disulphide Atomic Layers. Nat. Mater. 12, 754–759 (2013).
Zande, A. M. v. d. et al. Grains and Grain Boundaries in Highly Crystalline Monolayer Molybdenum Disulphide. Nat. Mater. 12, 554–561 (2013).
Zhang, C., Johnson, A., Hsu, C. L., Li, L. J. & Shih, C. K. Direct Imaging of Band Profile in Single Layer MoS2 on Graphite: Quasiparticle Energy Gap, Metallic Edge States, and Edge Band Bending. Nano Lett. 14, 2443–2447 (2014).
Ugeda, M. M. et al. Giant Bandgap Renormalization and Excitonic Effect in a Monolayer Transition Metal Dichalcogenide Semiconductor. Nat. Mater. 13, 1091–1095 (2014).
Huang, Y. L. et al. Bandgap Tunability at Single-Layer Molybdenum Disulphide Grain Boundaries. Nat. Commun. 6, 6298 (2015).
Lee, Y. H. et al. Synthesis of Large-Area MoS2 Atomic Layers with Chemical Vapor Deposition. Adv. Mater. 24, 2320–2325 (2012).
Andrei, E. Y., Li, G. & Du, X. Electronic Properties of Graphene: A Perspective from Scanning Tunneling Microscopy and Magnetotransport. Reports on Progress in Physics 75, 056501 (2012).
Li, G., Luican, A. & Andrei, E. Y. Scanning Tunneling Spectroscopy of Graphene on Graphite. Phys. Rev. Lett. 102 (17), 176804–176804 (2009).
Wang, S. et al. Shape Evolution of Monolayer MoS2 Crystals Grown by Chemical Vapor Deposition. Chemistry of Materials 26 (22), 6371–6379 (2014).
Lu, C. I. et al. Graphite Edge Controlled Registration of Monolayer Mos2 Crystal Orientation. Appl. Phys. Lett 106, 181904 (2015).
Schmidt, H. et al. Transport Properties of Monolayer MoS2 Grown by Chemical Vapor Deposition. Nano Lett. 14, 1909–1913 (2014).
Yun, W. S., Han, S. W., Hong, S. C., Kim, I. G. & Lee, J. D. Thickness and Strain Effect on Electronic Structures of Transition Metal Dichalcogenides: 2H-MX2 Semiconductors (M = Mo, W; X = S, Se, Te). Phys. Rev. B 85, 033305 (2012).
Alidoust, N. et al. Observation of monolayer valence band spin-orbit effect and induced quantum well states in MoX2 . Nature Comm. 5, 4673 (2014).
Pierucci, D. et al. Large area molybdenum disulphide- epitaxial graphene vertical Van der Waals heterostructures. Scientific Reports 6, 26652 (2016).
Mostofi, A. A. et al. An Updated Version of Wannier90: A Tool for Obtaining Maximally-Localised Wannier Functions,Comput. Phys. Commun. 185, 2309 (2014),.
Kresse, G. & Hafner, J. Ab Initio Molecular Dynamics for Open-Shell Transition Metals. Phys. Rev. B. 48, 13115 (1993).
Kresse, G. & Furthmüller, J. Efficient Iterative Schemes for Ab Initio Total-Energy Calculations Using a Plane-Wave Basis Set. Phys. Rev. B. 54, 11169 (1996).
Slater J. C. & Koster, G. F. Simplified LCAO Method for the Periodic Potential Problem. Phys. Rev. 94, 1498 (1954).
Harrison, W. A. Electronic Structure and the Properties of Solids — The Physics of the Chemical Bond; Dover: New York (1989).
Konschuh, S., Gmitra, M. & Fabian, J. Tight-Binding Theory of the Spin-Orbit Coupling in Graphene. Phys. Rev. B. 82, 245412 (2010).
Fetter, A. L. & Walecka, J. D. Quantum Theory of Many-Particle Systems; Dover: New York (2003).
Paulsson, M. & Brandbyge, M. Transmission Eigenchannels from Nonequilibrium Green’s Functions. Phys. Rev. B. 76, 115117 (2007).
Horsfield, A. P., Bratkovsky A. M., Fearn, M., Pettifor, D. G. & Aoki, M. Bond-Order Potentials: Theory and Implementation. Phys. Rev. B. 53, 12694 (1996).
Das, T., Markiewicz, R. S. & Bansil, A. Emergence of non-Fermi-liquid behavior due to Fermi surface reconstruction in the underdoped cuprate superconductors. Phys. Rev, B 81, 174504 (2010).
Nieminen, J., Suominen, I., Das, T., Markiewicz, R. S. & Bansil, A. Evidence of strong correlations at the van Hove singularity in the scanning tunneling spectra of superconducting Bi2Sr2CaCu2O8 + δ single crystals. Phys. Rev. B 85, 214504 (2012).
Todorov, T. N., Briggs, G. A. D. & Sutton, A. P. Elastic Quantum Transport Through Small Structures. J. Phys.: Condens. Matter 5, 2389 (1993).
Pendry, J. B., Prêtre, A. B. & Krutzen, C. H. Theory of the Scanning Tunneling Microscope. J. Phys.: Condens. Matter 3, 4313 (1991).
Tersoff, J. & Hamann, D. R. Theory of the Scanning Tunneling Microscope. Phys. Rev. B 31, 805 (1985).
Nieminen, J. A., Niemi, E. & Rieder, K.-H. Interference Between Competing Tunneling Channels and Chemical Resolution of STM. Surf. Sci. 552, L47 (2004).
Nieminen, J., Lin, H., Markiewicz, R. S. & Bansil, A. Origin of the Electron-Hole Asymmetry in the Scanning Tunneling Spectrum of the High-Temperature Bi2Sr2CaCu2O8 + δ Superconductor. Phys. Rev. Lett. 102, 037001 (2009).
Cappelluti, E., Roldán, R., Silva-Guillén, J. A., Ordejón, P. & Guinea, F. Tight-Binding Model and Direct-Gap/Indirect-Gap Transition in Single-Layer and Multilayer MoS2. Phys. Rev. B. 88, 075409 (2013.
This work was supported primarily by the Center for the Computational Design of Functional Layered Materials, an Energy Frontier Research Center funded by the US. Department of Energy, Office of Science, Basic Energy Sciences under Award #SC0012575 (STM measurements, AFM measurements, thin films growth and computations applied to layered materials). A.X.G. and R.U.C. acknowledge support from the US. Army Research Office, under Grant No. W911NF-15-1-0181 (XPEEM and μ-ARPES). We acknowledge Helmholtz-Zentrum Berlin for the use of the synchrotron radiation beamtime at beamline UE49 of BESSY II. C.D.G acknowledges the support from MIUR (Ministry of Education, Universities and Research of the Italian Government). This work benefited from the resources of Institute of Advanced Computing, Tampere. T.S. is grateful to Väisälä Foundation for financial support. H.L. acknowledges the Singapore National Research Foundation for the support under NRF Award No. NRF-NRFF2013-03 The work at Northeastern University was supported by the US Department of Energy (DOE), Office of Science, Basic Energy Sciences grant number DEFG02-07ER46352 (core research), and benefited from Northeastern University’s Advanced Scientific Computation Center (ASCC), the NERSC supercomputing center through DOE grant number DE-AC02-05CH11231, and support (applications to layered materials) from the DOE EFRC: Center for the Computational Design of Functional Layered Materials (CCDM) under DE-SC0012575.
The authors declare no competing financial interests.
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Trainer, D., Putilov, A., Di Giorgio, C. et al. Inter-Layer Coupling Induced Valence Band Edge Shift in Mono- to Few-Layer MoS2. Sci Rep 7, 40559 (2017). https://doi.org/10.1038/srep40559
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