Post on 06-Jan-2016
description
A New Understanding of the Tunneling Conductance Anomaly in Multi-Wall Carbon
Nanotubes
This work was motivated by a recent experiment which reports subtle new features in the suppression of the tunneling conductance (G) of multi-wall carbon nanotubes (MWCNTs) in the vicinity of Fermi energy.
Gmin does not occur strictly at zero-bias (deviation from zero-bias anomaly).Vmin is temperature-dependent.G vs.V curves exhibit asymmetry about Vmin.
It is demonstrated that a theoretical calculation based on a π-orbital tight-binding which includes inter-shell interaction can elucidate all the observed features of the tunneling conductance anomaly in MWCNTs without invoking electron-electron correlations.
Work Supported By the NSF and the U.S. DOE(DMR-0112824, ECS-0224114, and DE-FG02-00ER45832)
L. Liu, S.Y. Wu, and C.S. Jayanthi Dept. of Physics, University of Louisville
S. Chakraborty and B. AlphenaarDept. of Electrical and Computer Engineering
University of Louisville
Background • Since carbon nanotubes are quasi-one-dimensional systems, it is
tempting to explain the anomalous transport properties of metallic carbon nanotubes using a Luttinger-Liquid theory.
• A Luttinger-Liquid represents an interacting one-dimensional electron system with a non-fermi liquid behavior, which is characterized by the breakdown of the Landau quasi-particle picture, the opening of a small charge/spin gap, and the suppression of electron tunneling density of states with a power-law behavior.
• In fact, theoretical studies on isolated armchair SWCNTs based on a one-dimensional -orbital Hamiltonian supplemented by short-range/long-range e-e interactions yield suppressed tunneling near the Fermi level with a power law dependence of the conductance (G) on T at small bias voltage V (eV<<kT) or on V at large biases (eV>>kT), a signature of the Luttinger liquid (LL) behavior.
C. Kane, L. Balents, M. Fisher, PRL 79, 5086 (1997)
R. Egger and A.O. Gogolin, PRL 79, 5082 (1997)TG
VdVdI 40.~
0Fermi-LiquidCaveat: A LL theory applies only to a true 1D system !!
Experimental Evidences
A power-law scaling of the conductance and differential conductance with respect to T and V, respectively have been reported.
• Ropes of SWCNTs - Bockrath et al., Nature 397, 598 (1999)
A suppression of G in the vicinity of zero-bias with power-law scaling of conductance with respect to T (at zero-bias), or with respect to V at large biases (eV >> kT) have been reported.
• MWCNTs (1) A. Bachtold et al., PRL 87, 166801-1 (2001)
(2) C. Schonenberger et al., Appl. Phys. A 69, 283 (1999) (3) Chakraborty and Alphenaar (to be published)
Measured GT- vs. eV/kT for ropes of SWCNTs Bockrath et al., Nature 397, 598 (1999)
• dI/dV at various temperatures (1.6 K, 8K, 20K, 35 K)
• Power-law behavior at large V
• Scaled conductance at different temperatures fall onto a single curve
• ~ 0.36 ‘Bulk-contacted’Sample
Suppression of tunneling into multi-wall nanotubes Bachtold et al., PRL 87, 166801 (2001)
Mceuen’s Group
Tunneling Conductance Results: MWCNT UofL Experiments – Chakraborty et al.
Collapse of data ontoA “ single curve”
Power-law behavior
G ~ T
~ 0.2Vm
Vm shifts from0.4 mV at 2.7 K to 1.2 mV at 20 K
Asymmetry of the dip in G with respect to Vmin
Specific Features of the Experimental Results on MWCNTs – UofL experiments
Gmin does not exactly occur at zero-bias i.e.
there is deviation from the so-called zero-bias anomaly (ZBA)
G vs. V curves are asymmetric about Vmin Vmin depends on temperature.
Do factors other than electron-electron correlations play a role in these observations ?
Tunneling Conductance Spectra of zigzag SWCNTs
Ouyang et al. Science 292, 702 (2001) – Lieber’s Group
Atomic Structure of “metallic” zigzag SWCNTs using STM
Gap
Calculated DOS
A complete suppression of DOS
2/1 dEg
Experiment
Curvature effect !
Tunneling Conductance
Eg ~ 0.042 eV
Eg ~ 0.08 eV
Eg ~ 0.029 eV
Energy Gap of a (8,8) armchair SWNT in a rope/isolated tube
Atomically resolved images of an (8,8) SWCNT in a bundle
Atomically resolved image of an isolated (8,8) tube on a Au(111) substrate
Eg ~ 100 meV
DOS suppressed but notreduced completely to zeroat Ef
Eg ~ 1/d
“Pseudo-Gap”
No Gap
Calculated DOS ofisolated ASWCNT
An isolated tube haspractically a constantDOS and no suppression at Ef .
(induced by tube-tubeinteraction?)
A Summary of all experimental evidences
• Metallic zigzag SWCNTs have energy gaps which vary inversely proportional to the square of the radius, an indication of the curvature effect.
• Isolated armchair SWCNTs do not have energy gaps.• Armchair SWCNTs in ropes have pseudogaps.• SWCNTs in ropes exhibit a suppression in the tunneling
density of states near the Fermi level.• MWCNTs also exhibit a suppression in the tunneling
density of states near the Fermi level.
• Experimental evidences point to the fact that inter-tube
interactions is probably the reason for the appearance of
the pseudogap for the armchair SWCNT in a bundle
(mixing of π-π* bands due to breaking of rotational
symmetry in a bundle).
• The question we would like to pose is whether inter-shell
interactions can cause the suppression of the tunneling
density of states or tunneling conductance in MWCNTs?
An important clue from the experiment on ropes of ASWCNT
nmLnm
eVWeVW
d
LdW
ABBBAA
sheller
045.0;334.0
16.0;36.0
atoms coupled between Distance
orbitals betweenAngle
]/)(exp[cos
/
int
Lambin, Meunier, and Rubio – PRB 62, 5129 (2000)
Term Hopping
75.2layerraint
pp
eV Intra-layer interactions
Inter-layer interactions
-orbital tight-binding Hamiltonian for a MWCNT
Theoretical Calculations
DOS sample)(
junction impedance
-highest theacross drop voltage
Eq.(1))(
)(
E
V
dEdE
eVEdfE
dV
dI
S
S
Tunneling Conductance
Numerically Fitted s
s exhibits features that cannot
be described by a power-law behavior
in the vicinity of Fermi energy
s is asymmetric with respect to EF.
DOS
Calculated G (solid line)
2.7 K
20 K
4K
8K
12K16K
Tunneling conductance calculated (solid line) from numerically fitted s is compared with the experimental G (points)
The fitting of experimental conductance according to Eq. (1) can lead to a determination of the DOS of CNT samples of unknown compositions.
Extracting the sample DOS
Calculation of DOS for a model MWCNT
Calculation of DOS for a model MWCNT• A typical MWCNT of diameter 20 nm will be composed of 30 ~ SWCNT
shells (~ one third of them will be metals)
• However, we will consider a 10-wall MWCNT with its configuration given
by: (7,7)@(12,12)@….(47,47)@(52,52) with a diameter of ~ 7 nm.
• The MWCNT thus constructed is commensurate along the tube axis.
• However, there is no commensurability along the circumferencial direction
of MWCNTs, thus allowing disorder in that direction.
• We calculate the local density of states (LDOS) using the -orbital
Hamiltonians with intra-layer as well as inter-shell interactions.
• Examine the LDOS for the outermost shell.
DOS Results for the outermost shell of the MWCNT compared with an isolated SWCNT of the same type as the outer shell
(7,7)@(12,12)@......@(52,52)
Diameter ~ 7 nm
• This comparison highlights the effect of inter-shell interaction
• When the inter-shell interaction is turned-on, the level-level repulsion pushes the
pairs of vH peaks above and below the Fermi-level closer together, leading to
squeezing of vH pairs and fine structures in the DOS.
• The asymmetric squeezing of vH pairs is due to different degree of squeezing
for the bonding and anti-bonding states
Outermostshell of the MWCNT
(52,52) SWCNT
Effect of Inter-Shell Interaction
The first pair of vH peaks is squeezed by a factor of ~ 7,
the second pair by a factor of ~ 3, the third pair by a factor
of ~ 2.5, etc for the outermost (52,52) shell of the 7 nm
MWCNT with respect to the corresponding vH pairs of the
isolated SWCNT.
Modeling the DOS of a MWCNT of diameter ~ 20 nm : Scenario 1
Since it is impossible to calculate the LDOS of the outermost shell of a typical MWCNTof diameters ~ 20 nm once the inter-shell interaction is turned on, we design different schemes to capture the effect of inter-shell interaction, which place emphasis on different aspects of inter-shell interactions.
Scenario #1: The DOS of scenario-1 is constructed based on the LDOS of the outermost shell of the 10-shell MWCNT (d ~ 7 nm) but scaled down by a factor of ~10 to reflect the experimental sample both in terms of its larger diameter (20-nm) as well as its composition.
Modeling the DOS of MWCNTs of Diameters ~ 20 nm : Scenario 2
Construct the LDOS of the outermost shell using the average DOSs of three SWCNTs (151,144),(150,145), and (149,146) with diameters of ~ 20 nm
To mimic the effect of inter-shell interaction, apply the same squeeze factors to vH pairs, namely, the first pair by a factor of 7, the second pair by a factor of 3, and so on .., as obtained for the 10-wall MWCNT.
However, such a scaling-down of the vH-pair separations will not capture the asymmetric shift of vH peaks associated with different degrees of squeezing for bonding and anti-bonding states
s for different Scenarios
Scenario #1
Scenario 2
s for scenario # 1 is asymmetric while that for scenario #2 is symmetric. This is because there is no explicit inclusion of inter-shell interaction in scenario #2.
Numerical Fitting
12
s corresponding to different cases: A Summary
Isolated SWCNT
Outermost Shell
20 nm
DOS of the Sample
7 nm MWNT Inter-shell interaction included
Inter-shell interactionmimicked by scenario 1 and 2 s, respectively.
SchnonenbergerAppl. Phys. (’99)
Chakraborty et al. (UofL)
Bachtold et al. PRL (2001)
Scenarios #1 and #2 agree with the experiments of Schonenberger and Chakraborty, but disagree with that of Bachtold -- Why ??
Log-Log plots of G vs. T based on different scenarios for s compared to 3-different experiments ( )
Scenario-1: SolidScenario-2: dash
Scenario-3:long-short dashes
Scenario-2: dashScenario-1: solid
This discrepancy can be traced to the difference in the exponent (0.2 vs. 0.36)
The exponent and squeezing factors of pairs of vH peaks are related
It depends on the composition of the MWCNT
exp ~ 0.2
exp~ 0.2
exp~ 0.36
Scenario #3: It is obtained by squeezing the vH pairs of scenario 2 DOS by a factor of 12 to account for a different composition of the MWCNT sample.
GT- vs. eV/kT for different scenarios for s
Scenario -1
Scenario -2 = 0.19
Scenario-3
• Collapse of all data into one universal curve, which is normally taken as the evidence for a Luttinger-Liquid behavior.
• However, we obtain such a result without invoking electron-electron correlations.
= 0.18
= 0.63
Inter-shell interaction seems to have provided the most consistent explanation for experimental observations on tunneling conductance anomaly in MWCNTs.
Conclusion
Posters
• Energetics of Silicon Nanostructures on Si(111)-7x7 Surface using a Self-Consistent and Environment-Dependent Hamiltonian
M.Yu, S.Y. Wu, and C.S. Jayanthi
• First-Principles calculation of the electronic properties of Potassium-covered Carbon Nanotubes
Alex Tchernatinsky, G. Sumanasekera, S.Y. Wu, and C.S. Jayanthi
A new and alternative understanding of the tunneling conductance anomaly in
MWCNTs
We will demonstrate that all the features associated with
the suppression of tunneling conductance, those
previously reported as well as the new features observed
by Chakraborty et al., may be succinctly explained within
the framework of a one-electron theory (π-orbital tight-
binding) by incorporating the inter-shell interactions in a
MWCNT.