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'''Scanning tunneling spectroscopy (STS)''',  an extension of [[scanning tunneling microscopy]] (STM), is used to provide information about the density of electrons in a sample as a function of their energy.
 
In scanning tunneling microscopy, a metal tip is moved over a conducting sample without making mechanical contact. A bias voltage between the sample and tip allows a current to flow between the tip and the sample even though they are not in contact. This can occur because of quantum mechanical tunneling, hence the name of the instrument.
 
The scanning tunneling microscope is used to obtain "topographs" - topographic maps - of surfaces. The tip is rastered across a surface and (in constant current mode), a constant current is maintained between the tip and the sample by adjusting the height of the tip. A plot of the tip height at all measurement positions on the raster provides the topograph. These topographic images can obtain information that is atomically resolved, and images of metal and semiconductor surfaces can be obtained with atomic precision.
 
However, the scanning tunneling microscope does not measure the height of surface features. This can be shown when a molecule is adsorbed on a surface. The STM image may appear to have either increased or decreased height at that feature, although the geometry alone is certainly an increased height. A detailed analysis of the way in which an image is formed shows that the transmission of the electric current between the tip and the sample depends on two factors: (1) the geometry of the sample and (2) the arrangement of the electrons in the sample. The arrangement of the electrons in the sample is described quantum mechanically by an "electron density". The electron density is a function of both position and energy, and is formally described as the local density of electron states, abbreviated as local density of states (LDOS), which is a function of energy.
 
Spectroscopy, in its most general sense, refers to a measurement of the number of something as a function of energy. For scanning tunneling spectroscopy the scanning tunneling microscope is used to measure the number of electrons (the LDOS) as a function of the electron energy. The electron energy is set by the electrical potential difference (voltage) between the sample and the tip. The location is set by the position of the tip.
 
At its simplest, a "scanning tunneling spectrum" is obtained by placing a scanning tunneling microscope tip above a particular place on the sample. With the height of the tip fixed, the electron tunneling current is then measured as a function of electron energy by varying the voltage between the tip and the sample (the tip to sample voltage sets the electron energy). The change of the current with the energy of the electrons is the simplest spectrum that can be obtained, it is often referred to as an I-V curve. As is shown below, it is the slope of the I-V curve at each voltage (often called the dI/dV-curve) which is more fundamental because dI/dV corresponds to the electron density of states at the local position of the tip, the LDOS.
 
== Introduction ==
 
[[Image:Tunel spectroscopy.png|right|thumb|250 px|Mechanism of how density of states influence V-A spectra of tunnel junction]]
'''Scanning tunneling spectroscopy''' (STS) is an experimental technique which uses a [[scanning tunneling microscope]] (STM) to probe the local density of electronic states (LDOS) and the [[band gap]] of surfaces and materials on surfaces at the [[atom]]ic scale.<ref name="Oura">K. Oura, V. G. Lifshits, A. A. Saranin, A. V. Zotov, and M. Katayama, ''Surface Science: An Introduction'', Berlin: Springer-Verlag, 2003.</ref> Generally, STS involves observation of changes in [[constant-current]] [[topograph]]s with [[tip-sample bias]], local measurement of the tunneling current versus tip-sample bias (I-V) curve, measurement of the [[tunneling conductance]], <math>dI/dV</math>, or more than one of these.  Since the tunneling current in a scanning tunneling microscope only flows in a region with diameter ~5&nbsp;Å, STS is unusual in comparison with other surface [[spectroscopy]] techniques, which average over a larger surface region.  The origins of STS are found in some of the earliest STM work of [[Gerd Binnig]] and [[Heinrich Rohrer]], in which they observed changes in the appearance of some [[atom]]s in the (7 x 7) [[unit cell]] of the Si(111) – (7 x 7) surface with tip-sample [[Biasing (electronics)|bias]].<ref name="Hamers1">R. J. Hamers and D. F. Padowitz, “Methods of Tunneling Spectroscopy with the STM,” from ''Scanning Probe Microscopy and Spectroscopy: Theory, Techniques, and Applications'', 2nd ed., Ed. by D. A. Bonnell, New York: Wiley-VCH, Inc., 2001.</ref>  STS provides the possibility for probing the local electronic structure of [[metals]], [[semiconductor]]s, and thin insulators on a scale unobtainable with other spectroscopic methods. Additionally, topographic and spectroscopic data can be recorded simultaneously.
 
==Tunneling current==
 
Since STS relies on [[Quantum tunnelling|tunneling]] phenomena and measurement of the tunneling current or its [[derivative]], understanding the expressions for the tunneling current is very important. Using the modified Bardeen transfer Hamiltonian method, which treats tunneling as a [[Perturbation theory (quantum mechanics)|perturbation]], the tunneling current (I) is found to be
 
:::<math> I=\frac{4\pi e}{\hbar}\int_{-\infty}^{\infty}\left[f\left(E_F-eV+\epsilon\right)-f\left(E_F+\epsilon\right)\right]\rho_S\left(E_F-eV+\epsilon\right)\rho_T\left(E_F+\epsilon\right)\left|M_{\mu\nu}\right|^2\,d\epsilon
\ ,\qquad\qquad (1)</math>
 
where <math>f\left(E\right)</math> is the [[Fermi distribution]] function, <math>\rho_s</math> and <math>\rho_T</math> are the [[density of states]] (DOS) in the sample and tip, respectively, and <math>M_{\mu\nu}</math> is the tunneling matrix element between the modified wavefunctions of the tip and the sample surface.  The tunneling matrix element,
 
:::<math> M_{\mu\nu} = -\frac{\hbar^2}{2m} \int_\Sigma\left( \chi_\nu^*\nabla\psi_\mu - \psi_\mu\nabla\chi_\nu^*\right)\cdot \,d{\mathbf {S}}\ ,\qquad\qquad (2)</math>
 
describes the energy lowering due to the interaction between the two states.  Here <math>\psi</math> and <math>\chi</math> are the sample wavefunction modified by the tip potential, and the tip wavefunction modified by sample potential, respectively.<ref name="Chen">C. Julian Chen, ''Introduction to Scanning Tunneling Microscopy'', Oxford University Press New York (1993).</ref>
 
For low temperatures and a constant tunneling matrix element, the tunneling current reduces to
 
:::<math> I \propto\int_0^{eV} \rho_S\left(E_F-eV+\epsilon\right)\rho_T\left(E_F+\epsilon\right)\,d\epsilon\ ,\qquad\qquad (3)</math>
 
which is a convolution of the DOS of the tip and the sample.<ref name="Chen"/>  Generally, STS experiments attempt to probe the sample DOS, but equation (3) shows that the tip DOS must be known for the measurement to have meaning.  Equation (3) implies that
 
:::<math> \frac{dI}{dV} \propto\rho_S\left(E_F-eV\right)\ ,\qquad\qquad (4)</math>
 
under the gross assumption that the tip DOS is constant.  For these ideal assumptions, the tunneling conductance is directly proportional to the sample DOS.<ref name="Chen"/>
 
For higher bias voltages, the predictions of simple planar tunneling models using the Wentzel-Kramers Brillouin (WKB) approximation are useful.  In the WKB theory, the tunneling current is predicted to be
 
:::<math> I = \int_0^{eV}\rho_S\left(r,E\right)\rho_T\left(r,E-eV\right)T\left(E,eV,r\right)\,dE\ ,\qquad\qquad (5)</math>
 
where <math>\rho_s</math> and <math>\rho_t</math> are the density of states (DOS) in the sample and tip, respectively.<ref name="Hamers1"/>  The energy- and bias-dependent electron tunneling transition probability, T, is given by
 
:::<math>T=\exp\left(- \frac{2Z\sqrt{2m}}{\hbar}\sqrt{\frac{\phi_s+\phi_t}{2}+\frac{eV}{2}-E}\right)\ ,\qquad\qquad (6)</math>
 
where <math>\phi_s</math> and <math>\phi_t</math> are the respective [[work function]]s of the sample and tip and <math>Z</math> is the distance from the sample to the tip.<ref name="Hamers1"/>
 
==Experimental methods==
Acquiring [[Standard (metrology)|standard]] STM topographs at many different tip-sample biases and comparing to experimental topographic information is perhaps the most straightforward spectroscopic method. The tip-sample bias can also be changed on a line-by-line basis during a single scan. This method creates two interleaved images at different biases. Since only the states between the [[Fermi level]]s of the sample and the tip contribute to <math>I</math>, this method is a quick way to determine whether there are any interesting bias-dependent features on the surface.  However, only limited information about the electronic structure can be extracted by this method, since the constant <math>I</math> topographs depend on the tip and sample DOS’s and the tunneling transmission probability, which depends on the tip-sample spacing, as described in equation (5).<ref name="Wiesendanger">R. Wiesendanger, ''Scanning Probe Microscopy and Spectroscopy: Methods and Applications'', Cambridge, UK: Cambridge University Press, 1994.</ref>
 
By using modulation techniques, a constant current topograph and the spatially resolved <math>dI/dV</math> can be acquired simultaneously. A small, high frequency [[sinusoidal]] modulation voltage is superimposed on the [[direct current|D.C.]] tip-sample bias. The [[alternating current|A.C.]] component of the tunneling current is recorded using a lock-in amplifier, and the component in-phase with the tip-sample bias modulation gives <math>dI/dV</math> directly. In practice, the modulation frequency is chosen slightly higher than the bandwidth of the STM feedback system.<ref name="Wiesendanger"/> This choice prevents the feedback control from compensating for the modulation by changing the tip-sample spacing and minimizes the displacement current 90° out-of-phase with the applied bias modulation. Such effects arise from the capacitance between the tip and the sample, which grows as the modulation frequency increases.<ref name="Hamers1"/>
 
In order to obtain I-V curves simultaneously with a topograph, a sample-and-hold circuit is used in the feedback loop for the z piezo signal. The sample-and-hold circuit freezes the voltage applied to the z piezo, which freezes the tip-sample distance, at the desired location allowing I-V measurements without the feedback system responding.<ref name="Barrett">R. C. Barrett and S. Park, “Design Considerations for an STM System,” from ''Scanning Tunneling Microscopy'', Ed. by W. J. Kaiser and J. A. Stroscio, San Diego: Academic Press, Inc., 1993.</ref> The tip-sample bias is swept between the specified values, and the tunneling current is recorded. After the spectra acquisition, the tip-sample bias is returned to the scanning value, and the scan resumes. Using this method, the local electronic structure of semiconductors in the band gap can be probed.<ref name="Wiesendanger"/>
 
There are two ways to record I-V curves in the manner described above. In constant-spacing scanning tunneling spectroscopy (CS-STS), the tip stops scanning at the desired location to obtain an I-V curve. The tip-sample spacing is adjusted to reach the desired initial current, which may be different from the initial current setpoint, at a specified tip-sample bias. A sample-and-hold amplifier freezes the z piezo feedback signal, which holds the tip-sample spacing constant by preventing the feedback system from changing the bias applied to the z piezo.<ref name="Barrett"/> The tip-sample bias is swept through the specified values, and the tunneling current is recorded.  Either numerical differentiation of I(V) or lock-in detection as described above for modulation techniques can be used to find <math>dI/dV</math>.  If lock-in detection is used, then an A.C. modulation voltage is applied to the D.C. tip-sample bias during the bias sweep and the A.C. component of the current in-phase with the modulation voltage is recorded.
 
In variable-spacing scanning tunneling spectroscopy (VS-STS), the same steps occur as in CS-STS through turning off the feedback. As the tip-sample bias is swept through the specified values, the tip-sample spacing is decreased continuously as the magnitude of the bias is reduced.<ref name="Martensson">P. Mårtensson and R. M. Feenstra, “Geometric and electronic structure of antimony on the GaAs(110) surface studied by scanning tunneling microscopy,” Phys. Rev. B '''39''', 11 7744-7753 (1989).</ref> Generally, a minimum tip-sample spacing is specified to prevent the tip from crashing into the sample surface at the 0&nbsp;V tip-sample bias. Lock-in detection and modulation techniques are used to find the conductivity, because the tunneling current is a function also of the varying tip-sample spacing.  Numerical differentiation of I(V) with respect to V would include the contributions from the varying tip-sample spacing.<ref name="Feenstra1">R. M. Feenstra and J. A. Stroscio, “Methods of Tunneling Spectroscopy,” from ''Scanning Tunneling Microscopy'', Ed. by W. J. Kaiser and J. A. Stroscio, San Diego: Academic Press, Inc., 1993.</ref> Introduced by Mårtensson and Feenstra to allow conductivity measurements over several orders of magnitude, VS-STS is useful for conductivity measurements on systems with large band gaps. Such measurements are necessary to properly define the band edges and examine the gap for states.<ref name="Martensson"/>
 
Current-imaging-tunneling spectroscopy (CITS) is an STS technique where an I-V curve is recorded at each pixel in the STM topograph.<ref name="Feenstra1"/> Either variable-spacing or constant-spacing spectroscopy may be used to record the I-V curves. The conductance, <math>dI/dV</math>, can be obtained by numerical differentiation of I with respect to V or acquired using lock-in detection as described above. As a practical concern, the number of pixels in the scan or the scan area may be reduced to prevent piezo creep or thermal drift from moving the feature of study or the scan area during the duration of the scan. Since some CITS scans can last in excess of 12 hours, low drift and creep are absolutely necessary. The problem was fully solved by applying [[feature-oriented scanning]] (FOS) methodology.<ref>{{cite journal|author=R. V. Lapshin|year=2004|title=Feature-oriented scanning methodology for probe microscopy and nanotechnology|journal=Nanotechnology|volume=15|issue=9|pages=1135–1151|publisher=IOP|location=UK|issn=0957-4484|doi=10.1088/0957-4484/15/9/006|url=http://www.lapshin.fast-page.org/publications.htm#feature2004|format=PDF|bibcode = 2004Nanot..15.1135L }} ([http://www.lapshin.fast-page.org/publications.htm#feature2004 Russian translation] is available).</ref>
 
==Data interpretation==
 
From the obtained I-V curves, the band gap of the sample at the location of the I-V measurement can be determined. By plotting the magnitude of I on a [[log scale]] versus the tip-sample bias, the band gap can clearly be determined. Although determination of the band gap is possible from a [[linear plot]] of the I-V curve, the log scale increases the sensitivity.<ref name="Feenstra1"/> Alternatively, a plot of the conductance, <math>dI/dV</math>, versus the tip-sample bias, V, allows one to locate the band edges that determine the band gap.
 
The structure in the <math>dI/dV</math>, as a function of the tip-sample bias, is associated with the [[density of states]] of the surface when the tip-sample bias is less than the [[work function]]s of the tip and the sample. Usually, the [[WKB approximation]] for the tunneling current is used to interpret these measurements at low tip-sample bias relative to the tip and sample work functions. The derivative of equation (5), I in the WKB approximation, is
 
:::<math>\frac{dI}{dV}=\rho_s\left(r,eV\right)\rho_t\left(r,0\right)T\left(eV,eV,r\right)+\int_0^{eV}\rho_s\left(r,E\right)\rho_t\left(r,E-eV\right)\frac{dT\left(E,eV,r\right)}{dV}\,dE\  ,\qquad\qquad (7)</math>
 
where <math>\rho_s</math> is the sample density of states, <math>\rho_t</math> is the tip density of states, and T is the tunneling transmission probability.<ref name="Hamers1"/> Although the tunneling transmission probability T is generally unknown, at a fixed location T increases smoothly and monotonically with the tip-sample bias in the WKB approximation. Hence, structure in the <math>dI/dV</math> is usually assigned to features in the density of states in the first term of equation (7).<ref name="Wiesendanger"/>
 
Interpretation of <math>dI/dV</math> as a function of position is more complicated. Spatial variations in T show up in measurements of <math>dI/dV</math> as an inverted topographic background. When obtained in constant current mode, images of the spatial variation of <math>dI/dV</math> contain a convolution of topographic and electronic structure. An additional complication arises since <math>dI/dV=I/V</math> in the low-bias limit. Thus, <math>dI/dV</math> diverges as V approaches 0, preventing investigation of the local electronic structure near the Fermi level.<ref name="Wiesendanger"/>
 
Since both the tunneling current, equation (5), and the conductance, equation (7), depend on the tip DOS and the tunneling transition probability, T, quantitative information about the sample DOS is very difficult to obtain.  Additionally, the voltage dependence of T, which is usually unknown, can vary with position due to local fluctuations in the electronic structure of the surface.<ref name="Hamers1"/> For some cases, normalizing <math>dI/dV</math> by dividing by <math>I/V</math> can minimize the effect of the voltage dependence of T and the influence of the tip-sample spacing.  Using the WKB approximation, equations (5) and (7), we obtain:<ref name="Hamers2">R. J. Hamers, “STM on Semiconductors,” from ''Scanning Tunneling Microscopy I'', Springer Series in Surface Sciences 20, Ed. by H. -J. Güntherodt and R. Wiesendanger, Berlin: Springer-Verlag, 1992.</ref>
 
:::<math>\frac{dI/dV}{I/V}=\frac{\rho_s\left(r,eV\right)\rho_t\left(r,0\right)+\int_0^{eV}\frac{\rho_s\left(r,E\right)\rho_t\left(r,E-eV\right)}{T\left(eV,eV,r\right)}\frac{dT\left(E,eV,r\right)}{dV}\,dE}{\frac{1}{eV}\int_0^{eV}\rho_s\left(r,E\right)\rho_t\left(r,E-eV\right)\frac{T\left(E,eV,r\right)}{T\left(eV,eV,r\right)}\,dE}\ .\qquad\qquad (8)</math>
 
Feenstra et al. argued that the dependencies of <math>T\left(E,eV,r\right)</math> and <math>T\left(eV,eV,r\right)</math> on tip-sample spacing and tip-sample bias tend to cancel, since they appear as ratios.<ref name="Feenstra2">R.M. Feenstra, J. A. Stroscio, and A. P. Fein, “Tunneling Spectroscopy of the Si(111)2x1 Surface,” ''Surface Science'', '''181''', 295-306 (1987)</ref> This cancellation reduces the normalized conductance to the following form:
 
:::<math>\frac{dI/dV}{I/V}=\frac{d\left(logI\right)}{d\left(logV\right)}=\frac{\rho_s\left(r,eV\right)\rho_t\left(r,0\right)+A\left(V\right)}{B\left(V\right)}\ ,\qquad\qquad (9)</math>
 
where <math>B\left(V\right)</math> normalizes T to the DOS and <math>A\left(V\right)</math> describes the influence of the electric field in the tunneling gap on the decay length.  Under the assumption that <math>A\left(V\right)</math> and <math>B\left(V\right)</math> vary slowly with tip-sample bias, the features in <math>\left(dI/dV\right)/\left(I/V\right)</math> reflect the sample DOS, <math>\rho_s</math>.<ref name="Hamers1"/>
 
==Limitations==
 
While STS can provide spectroscopic information with amazing spatial resolution, there are some limitations. The STM and STS lack chemical sensitivity. Since the tip-sample bias range in tunneling experiments is limited to <math>\pm\phi/e</math>, where <math>\phi</math> is the apparent barrier height, STM and STS  only sample valence electron states. Element-specific information is generally impossible to extract from STM and STS experiments, since the chemical bond formation greatly perturbs the valence states.<ref name="Wiesendanger"/>
 
At finite temperatures, the thermal broadening of the electron energy distribution due to the Fermi-distribution limits spectroscopic resolution. At <math>T=300\,K</math>, <math>k_BT\approx0.026\,eV</math>, and the sample and tip energy distribution spread are both <math>2k_BT\approx0.052\,eV</math>.  Hence, the total energy deviation is <math>\Delta E\approx0.1\,eV</math>.<ref name="Chen"/> Assuming the dispersion relation for simple metals, it follows from the uncertainty relation <math>\Delta x\Delta k\ge 1/2</math> that
 
:::<math>\Delta E\ge \frac{\hbar^2k_F}{2M^*\Delta x}=0.47\frac{E_F-E_0}{rk_F}\ ,\qquad\qquad (10)</math>
 
where <math>E_F</math> is the [[Fermi energy]], <math>E_0</math> is the bottom of the valence band, <math>k_F</math> is the Fermi wave vector, and <math>r</math> is the lateral resolution. Since spatial resolution depends on the tip-sample spacing, smaller tip-sample spacings and higher topographic resolution blur the features in tunneling spectra.<ref name="Chen"/>
 
Despite these limitations, STS and STM provide the possibility for probing the local electronic structure of metals, semiconductors, and thin insulators on a scale unobtainable with other spectroscopic methods. Additionally, topographic and spectroscopic data can be recorded simultaneously.
 
==References==
{{Reflist}}
 
==Further reading==
 
* J. Tersoff and D. R. Hamann, Phys. Rev. B 31, 805 - 813 (1985)
* M. Morgenstern et al., J. Electron Spectrosc. Relat. Phenom. 109, 127 (2000)
* G. Binnig, H. Rohrer, Ch. Gerber, and E. Weibel, Phys. Rev. Lett. 50, 120 - 123 (1983)
* G. Binnig, H. Rohrer, Ch. Gerber, and E. Weibel, Phys. Rev. Lett. 49, 57 - 61 (1982)
* G. Binnig, H. Rohrer, Ch. Gerber, and E. Weibel, Appl. Phys. Lett., Vol. 40, Issue 2, pp.&nbsp;178–180 (1982)
*{{cite journal | last=Zandvliet | first=Harold J.W. | last2=Van Houselt | first2=A | title=Scanning Tunneling Spectroscopy | journal=Annual Review of Analytical Chemistry | volume=2 | url=http://arjournals.annualreviews.org/doi/abs/10.1146/annurev-anchem-060908-155213 | issue=1 | pages=37–55 | year=2009 | pmid=20636053 | doi=10.1146/annurev-anchem-060908-155213|bibcode = 2009ARAC....2...37Z }}
 
{{DEFAULTSORT:Scanning Tunneling Spectroscopy}}
[[Category:Scanning probe microscopy]]
[[Category:Spectroscopy]]

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Scanning tunneling spectroscopy (STS), an extension of scanning tunneling microscopy (STM), is used to provide information about the density of electrons in a sample as a function of their energy.

In scanning tunneling microscopy, a metal tip is moved over a conducting sample without making mechanical contact. A bias voltage between the sample and tip allows a current to flow between the tip and the sample even though they are not in contact. This can occur because of quantum mechanical tunneling, hence the name of the instrument.

The scanning tunneling microscope is used to obtain "topographs" - topographic maps - of surfaces. The tip is rastered across a surface and (in constant current mode), a constant current is maintained between the tip and the sample by adjusting the height of the tip. A plot of the tip height at all measurement positions on the raster provides the topograph. These topographic images can obtain information that is atomically resolved, and images of metal and semiconductor surfaces can be obtained with atomic precision.

However, the scanning tunneling microscope does not measure the height of surface features. This can be shown when a molecule is adsorbed on a surface. The STM image may appear to have either increased or decreased height at that feature, although the geometry alone is certainly an increased height. A detailed analysis of the way in which an image is formed shows that the transmission of the electric current between the tip and the sample depends on two factors: (1) the geometry of the sample and (2) the arrangement of the electrons in the sample. The arrangement of the electrons in the sample is described quantum mechanically by an "electron density". The electron density is a function of both position and energy, and is formally described as the local density of electron states, abbreviated as local density of states (LDOS), which is a function of energy.

Spectroscopy, in its most general sense, refers to a measurement of the number of something as a function of energy. For scanning tunneling spectroscopy the scanning tunneling microscope is used to measure the number of electrons (the LDOS) as a function of the electron energy. The electron energy is set by the electrical potential difference (voltage) between the sample and the tip. The location is set by the position of the tip.

At its simplest, a "scanning tunneling spectrum" is obtained by placing a scanning tunneling microscope tip above a particular place on the sample. With the height of the tip fixed, the electron tunneling current is then measured as a function of electron energy by varying the voltage between the tip and the sample (the tip to sample voltage sets the electron energy). The change of the current with the energy of the electrons is the simplest spectrum that can be obtained, it is often referred to as an I-V curve. As is shown below, it is the slope of the I-V curve at each voltage (often called the dI/dV-curve) which is more fundamental because dI/dV corresponds to the electron density of states at the local position of the tip, the LDOS.

Introduction

File:Tunel spectroscopy.png
Mechanism of how density of states influence V-A spectra of tunnel junction

Scanning tunneling spectroscopy (STS) is an experimental technique which uses a scanning tunneling microscope (STM) to probe the local density of electronic states (LDOS) and the band gap of surfaces and materials on surfaces at the atomic scale.[1] Generally, STS involves observation of changes in constant-current topographs with tip-sample bias, local measurement of the tunneling current versus tip-sample bias (I-V) curve, measurement of the tunneling conductance, dI/dV, or more than one of these. Since the tunneling current in a scanning tunneling microscope only flows in a region with diameter ~5 Å, STS is unusual in comparison with other surface spectroscopy techniques, which average over a larger surface region. The origins of STS are found in some of the earliest STM work of Gerd Binnig and Heinrich Rohrer, in which they observed changes in the appearance of some atoms in the (7 x 7) unit cell of the Si(111) – (7 x 7) surface with tip-sample bias.[2] STS provides the possibility for probing the local electronic structure of metals, semiconductors, and thin insulators on a scale unobtainable with other spectroscopic methods. Additionally, topographic and spectroscopic data can be recorded simultaneously.

Tunneling current

Since STS relies on tunneling phenomena and measurement of the tunneling current or its derivative, understanding the expressions for the tunneling current is very important. Using the modified Bardeen transfer Hamiltonian method, which treats tunneling as a perturbation, the tunneling current (I) is found to be

I=4πe[f(EFeV+ϵ)f(EF+ϵ)]ρS(EFeV+ϵ)ρT(EF+ϵ)|Mμν|2dϵ,(1)

where f(E) is the Fermi distribution function, ρs and ρT are the density of states (DOS) in the sample and tip, respectively, and Mμν is the tunneling matrix element between the modified wavefunctions of the tip and the sample surface. The tunneling matrix element,

Mμν=22mΣ(χν*ψμψμχν*)dS,(2)

describes the energy lowering due to the interaction between the two states. Here ψ and χ are the sample wavefunction modified by the tip potential, and the tip wavefunction modified by sample potential, respectively.[3]

For low temperatures and a constant tunneling matrix element, the tunneling current reduces to

I0eVρS(EFeV+ϵ)ρT(EF+ϵ)dϵ,(3)

which is a convolution of the DOS of the tip and the sample.[3] Generally, STS experiments attempt to probe the sample DOS, but equation (3) shows that the tip DOS must be known for the measurement to have meaning. Equation (3) implies that

dIdVρS(EFeV),(4)

under the gross assumption that the tip DOS is constant. For these ideal assumptions, the tunneling conductance is directly proportional to the sample DOS.[3]

For higher bias voltages, the predictions of simple planar tunneling models using the Wentzel-Kramers Brillouin (WKB) approximation are useful. In the WKB theory, the tunneling current is predicted to be

I=0eVρS(r,E)ρT(r,EeV)T(E,eV,r)dE,(5)

where ρs and ρt are the density of states (DOS) in the sample and tip, respectively.[2] The energy- and bias-dependent electron tunneling transition probability, T, is given by

T=exp(2Z2mϕs+ϕt2+eV2E),(6)

where ϕs and ϕt are the respective work functions of the sample and tip and Z is the distance from the sample to the tip.[2]

Experimental methods

Acquiring standard STM topographs at many different tip-sample biases and comparing to experimental topographic information is perhaps the most straightforward spectroscopic method. The tip-sample bias can also be changed on a line-by-line basis during a single scan. This method creates two interleaved images at different biases. Since only the states between the Fermi levels of the sample and the tip contribute to I, this method is a quick way to determine whether there are any interesting bias-dependent features on the surface. However, only limited information about the electronic structure can be extracted by this method, since the constant I topographs depend on the tip and sample DOS’s and the tunneling transmission probability, which depends on the tip-sample spacing, as described in equation (5).[4]

By using modulation techniques, a constant current topograph and the spatially resolved dI/dV can be acquired simultaneously. A small, high frequency sinusoidal modulation voltage is superimposed on the D.C. tip-sample bias. The A.C. component of the tunneling current is recorded using a lock-in amplifier, and the component in-phase with the tip-sample bias modulation gives dI/dV directly. In practice, the modulation frequency is chosen slightly higher than the bandwidth of the STM feedback system.[4] This choice prevents the feedback control from compensating for the modulation by changing the tip-sample spacing and minimizes the displacement current 90° out-of-phase with the applied bias modulation. Such effects arise from the capacitance between the tip and the sample, which grows as the modulation frequency increases.[2]

In order to obtain I-V curves simultaneously with a topograph, a sample-and-hold circuit is used in the feedback loop for the z piezo signal. The sample-and-hold circuit freezes the voltage applied to the z piezo, which freezes the tip-sample distance, at the desired location allowing I-V measurements without the feedback system responding.[5] The tip-sample bias is swept between the specified values, and the tunneling current is recorded. After the spectra acquisition, the tip-sample bias is returned to the scanning value, and the scan resumes. Using this method, the local electronic structure of semiconductors in the band gap can be probed.[4]

There are two ways to record I-V curves in the manner described above. In constant-spacing scanning tunneling spectroscopy (CS-STS), the tip stops scanning at the desired location to obtain an I-V curve. The tip-sample spacing is adjusted to reach the desired initial current, which may be different from the initial current setpoint, at a specified tip-sample bias. A sample-and-hold amplifier freezes the z piezo feedback signal, which holds the tip-sample spacing constant by preventing the feedback system from changing the bias applied to the z piezo.[5] The tip-sample bias is swept through the specified values, and the tunneling current is recorded. Either numerical differentiation of I(V) or lock-in detection as described above for modulation techniques can be used to find dI/dV. If lock-in detection is used, then an A.C. modulation voltage is applied to the D.C. tip-sample bias during the bias sweep and the A.C. component of the current in-phase with the modulation voltage is recorded.

In variable-spacing scanning tunneling spectroscopy (VS-STS), the same steps occur as in CS-STS through turning off the feedback. As the tip-sample bias is swept through the specified values, the tip-sample spacing is decreased continuously as the magnitude of the bias is reduced.[6] Generally, a minimum tip-sample spacing is specified to prevent the tip from crashing into the sample surface at the 0 V tip-sample bias. Lock-in detection and modulation techniques are used to find the conductivity, because the tunneling current is a function also of the varying tip-sample spacing. Numerical differentiation of I(V) with respect to V would include the contributions from the varying tip-sample spacing.[7] Introduced by Mårtensson and Feenstra to allow conductivity measurements over several orders of magnitude, VS-STS is useful for conductivity measurements on systems with large band gaps. Such measurements are necessary to properly define the band edges and examine the gap for states.[6]

Current-imaging-tunneling spectroscopy (CITS) is an STS technique where an I-V curve is recorded at each pixel in the STM topograph.[7] Either variable-spacing or constant-spacing spectroscopy may be used to record the I-V curves. The conductance, dI/dV, can be obtained by numerical differentiation of I with respect to V or acquired using lock-in detection as described above. As a practical concern, the number of pixels in the scan or the scan area may be reduced to prevent piezo creep or thermal drift from moving the feature of study or the scan area during the duration of the scan. Since some CITS scans can last in excess of 12 hours, low drift and creep are absolutely necessary. The problem was fully solved by applying feature-oriented scanning (FOS) methodology.[8]

Data interpretation

From the obtained I-V curves, the band gap of the sample at the location of the I-V measurement can be determined. By plotting the magnitude of I on a log scale versus the tip-sample bias, the band gap can clearly be determined. Although determination of the band gap is possible from a linear plot of the I-V curve, the log scale increases the sensitivity.[7] Alternatively, a plot of the conductance, dI/dV, versus the tip-sample bias, V, allows one to locate the band edges that determine the band gap.

The structure in the dI/dV, as a function of the tip-sample bias, is associated with the density of states of the surface when the tip-sample bias is less than the work functions of the tip and the sample. Usually, the WKB approximation for the tunneling current is used to interpret these measurements at low tip-sample bias relative to the tip and sample work functions. The derivative of equation (5), I in the WKB approximation, is

dIdV=ρs(r,eV)ρt(r,0)T(eV,eV,r)+0eVρs(r,E)ρt(r,EeV)dT(E,eV,r)dVdE,(7)

where ρs is the sample density of states, ρt is the tip density of states, and T is the tunneling transmission probability.[2] Although the tunneling transmission probability T is generally unknown, at a fixed location T increases smoothly and monotonically with the tip-sample bias in the WKB approximation. Hence, structure in the dI/dV is usually assigned to features in the density of states in the first term of equation (7).[4]

Interpretation of dI/dV as a function of position is more complicated. Spatial variations in T show up in measurements of dI/dV as an inverted topographic background. When obtained in constant current mode, images of the spatial variation of dI/dV contain a convolution of topographic and electronic structure. An additional complication arises since dI/dV=I/V in the low-bias limit. Thus, dI/dV diverges as V approaches 0, preventing investigation of the local electronic structure near the Fermi level.[4]

Since both the tunneling current, equation (5), and the conductance, equation (7), depend on the tip DOS and the tunneling transition probability, T, quantitative information about the sample DOS is very difficult to obtain. Additionally, the voltage dependence of T, which is usually unknown, can vary with position due to local fluctuations in the electronic structure of the surface.[2] For some cases, normalizing dI/dV by dividing by I/V can minimize the effect of the voltage dependence of T and the influence of the tip-sample spacing. Using the WKB approximation, equations (5) and (7), we obtain:[9]

dI/dVI/V=ρs(r,eV)ρt(r,0)+0eVρs(r,E)ρt(r,EeV)T(eV,eV,r)dT(E,eV,r)dVdE1eV0eVρs(r,E)ρt(r,EeV)T(E,eV,r)T(eV,eV,r)dE.(8)

Feenstra et al. argued that the dependencies of T(E,eV,r) and T(eV,eV,r) on tip-sample spacing and tip-sample bias tend to cancel, since they appear as ratios.[10] This cancellation reduces the normalized conductance to the following form:

dI/dVI/V=d(logI)d(logV)=ρs(r,eV)ρt(r,0)+A(V)B(V),(9)

where B(V) normalizes T to the DOS and A(V) describes the influence of the electric field in the tunneling gap on the decay length. Under the assumption that A(V) and B(V) vary slowly with tip-sample bias, the features in (dI/dV)/(I/V) reflect the sample DOS, ρs.[2]

Limitations

While STS can provide spectroscopic information with amazing spatial resolution, there are some limitations. The STM and STS lack chemical sensitivity. Since the tip-sample bias range in tunneling experiments is limited to ±ϕ/e, where ϕ is the apparent barrier height, STM and STS only sample valence electron states. Element-specific information is generally impossible to extract from STM and STS experiments, since the chemical bond formation greatly perturbs the valence states.[4]

At finite temperatures, the thermal broadening of the electron energy distribution due to the Fermi-distribution limits spectroscopic resolution. At T=300K, kBT0.026eV, and the sample and tip energy distribution spread are both 2kBT0.052eV. Hence, the total energy deviation is ΔE0.1eV.[3] Assuming the dispersion relation for simple metals, it follows from the uncertainty relation ΔxΔk1/2 that

ΔE2kF2M*Δx=0.47EFE0rkF,(10)

where EF is the Fermi energy, E0 is the bottom of the valence band, kF is the Fermi wave vector, and r is the lateral resolution. Since spatial resolution depends on the tip-sample spacing, smaller tip-sample spacings and higher topographic resolution blur the features in tunneling spectra.[3]

Despite these limitations, STS and STM provide the possibility for probing the local electronic structure of metals, semiconductors, and thin insulators on a scale unobtainable with other spectroscopic methods. Additionally, topographic and spectroscopic data can be recorded simultaneously.

References

43 year old Petroleum Engineer Harry from Deep River, usually spends time with hobbies and interests like renting movies, property developers in singapore new condominium and vehicle racing. Constantly enjoys going to destinations like Camino Real de Tierra Adentro.

Further reading

  • J. Tersoff and D. R. Hamann, Phys. Rev. B 31, 805 - 813 (1985)
  • M. Morgenstern et al., J. Electron Spectrosc. Relat. Phenom. 109, 127 (2000)
  • G. Binnig, H. Rohrer, Ch. Gerber, and E. Weibel, Phys. Rev. Lett. 50, 120 - 123 (1983)
  • G. Binnig, H. Rohrer, Ch. Gerber, and E. Weibel, Phys. Rev. Lett. 49, 57 - 61 (1982)
  • G. Binnig, H. Rohrer, Ch. Gerber, and E. Weibel, Appl. Phys. Lett., Vol. 40, Issue 2, pp. 178–180 (1982)
  • One of the biggest reasons investing in a Singapore new launch is an effective things is as a result of it is doable to be lent massive quantities of money at very low interest rates that you should utilize to purchase it. Then, if property values continue to go up, then you'll get a really high return on funding (ROI). Simply make sure you purchase one of the higher properties, reminiscent of the ones at Fernvale the Riverbank or any Singapore landed property Get Earnings by means of Renting

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    Discover out more about real estate funding in the area, together with info on international funding incentives and property possession. Many Singaporeans have been investing in property across the causeway in recent years, attracted by comparatively low prices. However, those who need to exit their investments quickly are likely to face significant challenges when trying to sell their property – and could finally be stuck with a property they can't sell. Career improvement programmes, in-house valuation, auctions and administrative help, venture advertising and marketing, skilled talks and traisning are continuously planned for the sales associates to help them obtain better outcomes for his or her shoppers while at Knight Frank Singapore. No change Present Rules

    Extending the tax exemption would help. The exemption, which may be as a lot as $2 million per family, covers individuals who negotiate a principal reduction on their existing mortgage, sell their house short (i.e., for lower than the excellent loans), or take part in a foreclosure course of. An extension of theexemption would seem like a common-sense means to assist stabilize the housing market, but the political turmoil around the fiscal-cliff negotiations means widespread sense could not win out. Home Minority Chief Nancy Pelosi (D-Calif.) believes that the mortgage relief provision will be on the table during the grand-cut price talks, in response to communications director Nadeam Elshami. Buying or promoting of blue mild bulbs is unlawful.

    A vendor's stamp duty has been launched on industrial property for the primary time, at rates ranging from 5 per cent to 15 per cent. The Authorities might be trying to reassure the market that they aren't in opposition to foreigners and PRs investing in Singapore's property market. They imposed these measures because of extenuating components available in the market." The sale of new dual-key EC models will even be restricted to multi-generational households only. The models have two separate entrances, permitting grandparents, for example, to dwell separately. The vendor's stamp obligation takes effect right this moment and applies to industrial property and plots which might be offered inside three years of the date of buy. JLL named Best Performing Property Brand for second year running

    The data offered is for normal info purposes only and isn't supposed to be personalised investment or monetary advice. Motley Fool Singapore contributor Stanley Lim would not personal shares in any corporations talked about. Singapore private home costs increased by 1.eight% within the fourth quarter of 2012, up from 0.6% within the earlier quarter. Resale prices of government-built HDB residences which are usually bought by Singaporeans, elevated by 2.5%, quarter on quarter, the quickest acquire in five quarters. And industrial property, prices are actually double the levels of three years ago. No withholding tax in the event you sell your property. All your local information regarding vital HDB policies, condominium launches, land growth, commercial property and more

    There are various methods to go about discovering the precise property. Some local newspapers (together with the Straits Instances ) have categorised property sections and many local property brokers have websites. Now there are some specifics to consider when buying a 'new launch' rental. Intended use of the unit Every sale begins with 10 p.c low cost for finish of season sale; changes to 20 % discount storewide; follows by additional reduction of fiftyand ends with last discount of 70 % or extra. Typically there is even a warehouse sale or transferring out sale with huge mark-down of costs for stock clearance. Deborah Regulation from Expat Realtor shares her property market update, plus prime rental residences and houses at the moment available to lease Esparina EC @ Sengkang
  1. K. Oura, V. G. Lifshits, A. A. Saranin, A. V. Zotov, and M. Katayama, Surface Science: An Introduction, Berlin: Springer-Verlag, 2003.
  2. 2.0 2.1 2.2 2.3 2.4 2.5 2.6 R. J. Hamers and D. F. Padowitz, “Methods of Tunneling Spectroscopy with the STM,” from Scanning Probe Microscopy and Spectroscopy: Theory, Techniques, and Applications, 2nd ed., Ed. by D. A. Bonnell, New York: Wiley-VCH, Inc., 2001.
  3. 3.0 3.1 3.2 3.3 3.4 C. Julian Chen, Introduction to Scanning Tunneling Microscopy, Oxford University Press New York (1993).
  4. 4.0 4.1 4.2 4.3 4.4 4.5 R. Wiesendanger, Scanning Probe Microscopy and Spectroscopy: Methods and Applications, Cambridge, UK: Cambridge University Press, 1994.
  5. 5.0 5.1 R. C. Barrett and S. Park, “Design Considerations for an STM System,” from Scanning Tunneling Microscopy, Ed. by W. J. Kaiser and J. A. Stroscio, San Diego: Academic Press, Inc., 1993.
  6. 6.0 6.1 P. Mårtensson and R. M. Feenstra, “Geometric and electronic structure of antimony on the GaAs(110) surface studied by scanning tunneling microscopy,” Phys. Rev. B 39, 11 7744-7753 (1989).
  7. 7.0 7.1 7.2 R. M. Feenstra and J. A. Stroscio, “Methods of Tunneling Spectroscopy,” from Scanning Tunneling Microscopy, Ed. by W. J. Kaiser and J. A. Stroscio, San Diego: Academic Press, Inc., 1993.
  8. One of the biggest reasons investing in a Singapore new launch is an effective things is as a result of it is doable to be lent massive quantities of money at very low interest rates that you should utilize to purchase it. Then, if property values continue to go up, then you'll get a really high return on funding (ROI). Simply make sure you purchase one of the higher properties, reminiscent of the ones at Fernvale the Riverbank or any Singapore landed property Get Earnings by means of Renting

    In its statement, the singapore property listing - website link, government claimed that the majority citizens buying their first residence won't be hurt by the new measures. Some concessions can even be prolonged to chose teams of consumers, similar to married couples with a minimum of one Singaporean partner who are purchasing their second property so long as they intend to promote their first residential property. Lower the LTV limit on housing loans granted by monetary establishments regulated by MAS from 70% to 60% for property purchasers who are individuals with a number of outstanding housing loans on the time of the brand new housing purchase. Singapore Property Measures - 30 August 2010 The most popular seek for the number of bedrooms in Singapore is 4, followed by 2 and three. Lush Acres EC @ Sengkang

    Discover out more about real estate funding in the area, together with info on international funding incentives and property possession. Many Singaporeans have been investing in property across the causeway in recent years, attracted by comparatively low prices. However, those who need to exit their investments quickly are likely to face significant challenges when trying to sell their property – and could finally be stuck with a property they can't sell. Career improvement programmes, in-house valuation, auctions and administrative help, venture advertising and marketing, skilled talks and traisning are continuously planned for the sales associates to help them obtain better outcomes for his or her shoppers while at Knight Frank Singapore. No change Present Rules

    Extending the tax exemption would help. The exemption, which may be as a lot as $2 million per family, covers individuals who negotiate a principal reduction on their existing mortgage, sell their house short (i.e., for lower than the excellent loans), or take part in a foreclosure course of. An extension of theexemption would seem like a common-sense means to assist stabilize the housing market, but the political turmoil around the fiscal-cliff negotiations means widespread sense could not win out. Home Minority Chief Nancy Pelosi (D-Calif.) believes that the mortgage relief provision will be on the table during the grand-cut price talks, in response to communications director Nadeam Elshami. Buying or promoting of blue mild bulbs is unlawful.

    A vendor's stamp duty has been launched on industrial property for the primary time, at rates ranging from 5 per cent to 15 per cent. The Authorities might be trying to reassure the market that they aren't in opposition to foreigners and PRs investing in Singapore's property market. They imposed these measures because of extenuating components available in the market." The sale of new dual-key EC models will even be restricted to multi-generational households only. The models have two separate entrances, permitting grandparents, for example, to dwell separately. The vendor's stamp obligation takes effect right this moment and applies to industrial property and plots which might be offered inside three years of the date of buy. JLL named Best Performing Property Brand for second year running

    The data offered is for normal info purposes only and isn't supposed to be personalised investment or monetary advice. Motley Fool Singapore contributor Stanley Lim would not personal shares in any corporations talked about. Singapore private home costs increased by 1.eight% within the fourth quarter of 2012, up from 0.6% within the earlier quarter. Resale prices of government-built HDB residences which are usually bought by Singaporeans, elevated by 2.5%, quarter on quarter, the quickest acquire in five quarters. And industrial property, prices are actually double the levels of three years ago. No withholding tax in the event you sell your property. All your local information regarding vital HDB policies, condominium launches, land growth, commercial property and more

    There are various methods to go about discovering the precise property. Some local newspapers (together with the Straits Instances ) have categorised property sections and many local property brokers have websites. Now there are some specifics to consider when buying a 'new launch' rental. Intended use of the unit Every sale begins with 10 p.c low cost for finish of season sale; changes to 20 % discount storewide; follows by additional reduction of fiftyand ends with last discount of 70 % or extra. Typically there is even a warehouse sale or transferring out sale with huge mark-down of costs for stock clearance. Deborah Regulation from Expat Realtor shares her property market update, plus prime rental residences and houses at the moment available to lease Esparina EC @ Sengkang (Russian translation is available).
  9. R. J. Hamers, “STM on Semiconductors,” from Scanning Tunneling Microscopy I, Springer Series in Surface Sciences 20, Ed. by H. -J. Güntherodt and R. Wiesendanger, Berlin: Springer-Verlag, 1992.
  10. R.M. Feenstra, J. A. Stroscio, and A. P. Fein, “Tunneling Spectroscopy of the Si(111)2x1 Surface,” Surface Science, 181, 295-306 (1987)