EEW508 V. Electrical Properties at Surfaces Measurement of work function - Thermionic Emission -...
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Transcript of EEW508 V. Electrical Properties at Surfaces Measurement of work function - Thermionic Emission -...
EEW508V. Electrical Properties at Surfaces
Measurement of work function
- Thermionic Emission- Photoemission - Field Emission
EEW508V. Electrical Properties at Surfaces
The electron in the conduction band follow Fermi-Dirac statistics with the probability of occupancy being given by
1exp
1)(
kT
f
The Fermi-Dirac probability distributionfunction
The Bose-Einstein probability distribution function
1exp
1)(
kT
f
μ is the chemical potential, k is the Boltzmann constant, and T is temperature.
Density of state curve for the conduction band of a free electron metal
The electron in the conduction band follow Fermi-Dirac statistics with the probability of occupancy being given by
1exp
1)(
kT
f
At T=0K, all of the states for which will be filled and all states for which > will be empty. The value of corresponding to = is called the Fermi energy.
At temperature above 0 K, the probability of occupancy of states just above F becomes finite.
EEW508V. Electrical Properties at Surfaces
Surface Science; An IntroductionJ. B. Hudson (1992)
Measurement of work function – a. Thermionic emission
At high temperature, states with - F > will have a probability of occupancy given by
kTkTf
))((expexp)(
Where - ( +) represents the energy in excess of that needed to reach the vacuum level. Any electron with - ( +) >0 is essentially outside of the crystal and can be collected as a free electron.
Such electrons are called thermionic electrons and the process by which they are produced is called thermionic emission.
EEW508V. Electrical Properties at Surfaces
Measurement of work function- a. Thermionic emission
Richardson-Dushman equation
The expression relating thermionic current j to temperature
kT
ATj exp2
Plot of Richardson-Dushman equationFor different faces of tungsten
Where A = 4 mk2e/h3 ~ 120 A /cm2 deg2
To obtain work function from a thermionic emission measurement, one plots ln (j/T2) as a function of 1/T
EEW508V. Electrical Properties at Surfaces
Thermionic emission at metal-semiconductor Schottky diodeassumes that electrons, with an energy larger than the top of the barrier, will cross the
barrier provided they move towards the barrier
Energy diagram of metal-semiconductor Schottky diode
10expexp2*TBk
ISRaVe
TBknTFAI
Where F = Area, Φn = Schottky Barrier Height, η =
Ideality Factor, Rs = Series Resistance, respectively.
A* [Effective Richardson Constant] = 4 m* k2e/h3
The effective mass of the conduction electrons in GaN, m* = 0.22m0, gives an effective Richardson constant A* (GaN) =
2.64 x 104 A/cm2K. The effective Richardson constant for TiO2 is A = 24 A/cm2K.
For thermionic emission over the barrier, the current density of Schottky contacts as a function of applied voltage is given by
EEW508V. Electrical Properties at Surfaces
Measurement of work function- b. Photoelectron emission
Any photon incident on the sample surface can interact with an electron in the solid to transfer its energy to the electron. If this energy is greater than the difference between the initial energy of the electron and the vacuum energy, then the electron may escape from the solid.
This process is called photoelectron emission. The ejected electrons are called photoelectrons.
If the minimum photon energy, hvo, can cause electron ejection, the work function () is the same with hvo
hvo
Fermi level
Vacuum level
EEW508V. Electrical Properties at Surfaces
Photoelectron emission- Fowler law
The total electron current generated in this process is given by the Fowler equation
kT
hfBTj o )(2
Where B is a parameter that depends on the material involved. If measurements are made of the photoemitted current as a function of photon energy, extrapolation allows the determination of vo, thus
EEW508V. Electrical Properties at Surfaces
Measurement of work function- c. Field emission
If a strong electric field is present at the surface with the surface electrically negative wrt the surroundings, the effective surface barrier will be modified with smaller height and width.
In this case, a quantum mechanical calculation indicates that electrons can escape through the barrier by quantum mechanical tunneling and appear in the space outside the metal as field-emitted electrons
EEW508V. Electrical Properties at Surfaces
Measurement of work function- c. Field emissionFowler-Nordheim equation
The current arising from this process is given by the Fowler-Nordheim equation as
Where F is the electric field strength, and is a slowly varying function of F, of the order of unity.
A plot of this relation, ln (j/F2) vs (1/F) can be used to determine work function
EEW508V. Electrical Properties at Surfaces
Field Emission (Fowler-Nordheim equation)
EEW508V. Electrical Properties at Surfaces
If we change this equation to the more feasible form
where, is work function in eV, I is the emission current in A, V is theapplied voltage in V.
In this equation, is called the field enhancement factor, and defined as E= VLikewise, I=JA, where A is the effective emitting area of electron source in cm2.
Field Emission (Fowler-Nordheim equation)
EEW508V. Electrical Properties at Surfaces
The range of electrostatic field for field emission is 3 - 7 x 10 7(V/cm). The field E at the surface of a free sphere of radius r and potential V is E = V / r
At the surface of an actual tip, the field is reduced from this value by the presence of the cylindrical or conical shank, is given to a very good approximation byE = V / kr, where k ~ 5 In other words, for the sharp field emission source, is 1/kr and is not significantly dependent on the distance between the tip and anode.
In case of the planar field emission source as like diamond, DLC(Diamond like carbon), and boron nitride, is inversely proportional to the tip-anode distance.
increases from 3.27 x 105 to 7.98 x 105 cm -
1 as the tip approaches an anode from distance of 30 m–500 nm.
Park et al. Rev. Sci. Instru. (1999).
Measurement of work function- c. Field emissionField emission microscopy
Field emission microscopy image of a clean Rh(111)
The contrast observed in FEM arises from the variation in work function with crystallographic orientation over the tip.
This technique along with F-N plot, allows the measurement of the variation of work function with orientation. FEM(field emission microscopy) has been used to measure adsorption and surface diffusion processes.
EEW508V. Electrical Properties at Surfaces
VI. Mechanical Properties at Surfaces
Mechanical properties of a surface
(a) Static properties: hardness, young’s modulus, yield strength and adhesion – how the surface deforms when it is indented or stretched by external load
(b) Dynamic property: friction – how the surface resists the relative motion against another surface
Questions onWhy materials are hard or soft?Why some surfaces are slippery while others are not?How surfaces deform?
EEW508VI. Mechanical Properties at Surfaces
tensile stress and strain
In a tensile test, a specimen with the initial length l0 and cross sectional area A0 is subjected to a tensile load, L.
The length of specimen, l, increases as the load increases.
The tensile stress, ,is defined as
The strain , , is defined as
0A
L
l
ll )( 0
EEW508VI. Mechanical Properties at Surfaces
The Poisson effect
When a sample of cube of a material is stretched in one direction, it tends to contract in the other two directions perpendicular to the direction of stretch. This phenomenon is called the Poisson effect
Poisson’s ratio characterize Poisson effect
y
x
Where x is the transverse strain (normal to the applied load) and y is the axial strain (in the direction of the applied load)
yyyy
xxxx
lll
lll
00
00
/)(
/)(
EEW508VI. Mechanical Properties at Surfaces
The Poisson’s ratio of materials
For most materials, the stretch in one direction causes the contraction in transverse directions positive Poisson’s ratio
Some materials like cork shows very little transverse expansion when stretched or compressed Poisson’s ratio very close to zero
Some materials such as polymer foams have a negative Poisson’s ratio
Because the cross sectional area, A, changes under the tensile load (Poisson effect), the true tensile stress is defined as
A
L
EEW508VI. Mechanical Properties at Surfaces
A typical stress-strain curve for ductile materials
(1) Elastic deformation: atoms are slightly displaced away from their equilibrium position. Young’s modulus,
E, (or elastic modulus) describes this region. E = d / d (2) Once the stress is increased beyond the yield point, the specimen will undergo the plastic deformation.
The stress at the yield point is called yield strength y (3) Stain hardening: the tensile stress needs to increase appreciably for additional strain to occur. The
maximum stress reached in the strain-hardening region defines tensile strength (or ultimate strength) of
materials, u (4) Necking: necking occurs with the cross-sectional area in a localized region of the specimen decreasing
rapidly. (5) Fracture : the specimen will rapture at the fracture stress
EEW508VI. Mechanical Properties at Surfaces
A typical stress-strain curve for Brittle materials
brittle materials fracture at much lower strains, but often have relatively large elastic moduli and ultimate strength in comparison to ductile materials
Schematic appearance of round metal bars after tensile testing.(a) Brittle fracture(b) Ductile fracture(c) Completely ductile fracture
EEW508VI. Mechanical Properties at Surfaces
Dislocation and plastic deformation
Edge dislocation
Dislocation : one-dimensional defects in materials
Plastic deformation is carried out by the movement of dislocation in materials.
There is compressive stress in the upper region of the dislocation while the tensile region in the lower region.
As the external stress increases beyond the yield strength of a material, more dislocation will be generated. At the certain concentration of dislocation, dislocations will hinder the further movement of each other. To cause further plastic deformation, increase of the external stress is needed.
EEW508VI. Mechanical Properties at Surfaces
Hall-Petch relation: the grain size dependence of the yield strength
Where 0 , k are material constants and d is the grain size.
This relation is effective polycrystalline materials with the grain size of mm~micrometer
Hall-Petch relation (d> 1m)
In polycrystalline materials, small size grains with crystalline structures are surrounded by grain boundaries.
The grain boundary serves as an obstacle to the movement of dislocations so that the number of dislocations piled up in the grain.
For a small grain, a larger external stress is needed to generate the same number of dislocations as that in a larger grain.
2/10 d
ky
Hall-Petch relation for 99.999% Al
EEW508VI. Mechanical Properties at Surfaces
Inverse Hall-Petch effect (d< 1m)
When the grain size is less than 25 nm, the inverse Hall-Petch relation was reported by Chokshi et al.
For nanostructured materials, plastic deformation is mainly carried out by the sliding of the grain boundries.
Combined Hall-Petch plot for Cu from different sources.
EEW508VI. Mechanical Properties at Surfaces
Indentation
When the surface is indented by a hard indenter
(a) Small load – elastic deformation – no bond breaking, thus reversible process
(b) High load- plastic deformation – chemical bonds in the close vicinity of the indenter tip begin to break - permanent deformation
Indenter profile left after the indentation by a square diamond indenter (Vickers test)
EEW508VI. Mechanical Properties at Surfaces
Hardness
The indentation hardness, H, is given by
H=P/Awhere P is the applied pressure,
and A is the surface area of indent.
The indenter is either the Vickers diamond pyramid (Vickers test) or the Knoop elongated diamond pyramid (Knoop test)
Vickers indenter penetrates about twice as deep as Knoop indenter
Pa = N/m2
EEW508VI. Mechanical Properties at Surfaces
More information
http://www.memsnet.org/material/
Macroscopic hardness measured by the tests with large indenters is usually much lower than that intrinsic hardness for single crystal.
One reason for this discrepancy is that most materials have lots of defects inside bulk. The plastic deformation in the macroscopic indentation tests usually initiates at those defect sites.
The macroscopic hardness depends on the defect density of a material.
EEW508VI. Mechanical Properties at Surfaces
Study of friction – tribology (‘tribo’ means ‘to rub’)
Surfaces in contact and moving parallel to each other exhibit phenomena that are encountered in our everyday life.
These phenomena include friction, slide, wear, and lubrication (the process to modify or reduce friction).
The consequences of friction and wear have enormous economic impact, and are of great concern from both a national-security and quality-of-life point of view.
improved attention to friction and wear would save developed countries up to 1.6% of their gross national product, or over $100 billion annually in the U.S. alone.
‘‘Tribology: Origin and Future,’’ H.P. Jost, Wear 136 , 1–17 (1990).
EEW508VI. Mechanical Properties at Surfaces
Static friction (Stiction) of nanoscale objects
Friction, adhesion, and wear are important issues at nanometer scale because of large surface area-to-volume ratio
Vital issues in reliability of MEMS or NEMS devices.
MEMS: microelectromechanical systems
NEMS: nanoelectromechanical systems
EEW508VI. Mechanical Properties at Surfaces
History of Tribology
Egyptians using lubricant to aid movement of Colossus, El-Bersheh, circa 1800 BC
The use of a sledge to transport a heavy statueBy Egyptians, and there is one man pouring the liquid
60 tons – 172 people.
EEW508VI. Mechanical Properties at Surfaces
LF
Amanton’s Law
static friction force :The force needed to beovercome in order to initiate the sliding of an object
Kinetic static force: the force that must be overcome in order to maintain the sliding of an object over a surface
(Static friction force) > (kinetic friction force)Leonardo Da Vinci’s scheme to test friction
Where is the friction coefficient
Over a wide range of loads, the friction force is independent of the contact area between the object and the surface.
Proportionality : first Amanton’s Law of Friction The independency: second Amanton’s Law of FrictionThese laws were discovered by Leonardo da Vinci and then rediscovered by Guillanume Amantons
EEW508VI. Mechanical Properties at Surfaces
Friction force is proportional to the contact area(by Bowden and Tabor)
The real contact area is much smaller than the apparent contact area
Because the adhesion between two surfaces increases with the contact area, the friction increases with the contact area
Bowden and Tabor points out that the friction force is proportional to the ‘real’ contact area
realAcF
LAreal Combining this with Amanton’s Law
The real contacts formed at the interfaces of two surfaces
EEW508VI. Mechanical Properties at Surfaces
Tire loses 20-30 % of its tire-road friction on the wet road.
The main reason causing the friction reduction is sealing water in the small valley, effectively reducing the real contact area between the road and the tire.
Likewise the main reason that the static friction coefficient (s) is larger than kinetic friction coefficient (k) is reduction of the real contact area of dynamic parts.
Why is the wet surface more slippery than the dry surface?
EEW508VI. Mechanical Properties at Surfaces
Friction is energy dissipation of mechanical energy
In order to keep an object at a constant velocity, v, over a surface, work must be performed continuously to the object. The work done in a unit of time is given by
LvFvdt
dW
In most cases, the input work dissipates as heat at the interface. The friction heating can be applied to lighten a match, to weld two lower-melting-point materials, etc.
Another mechanism of energy dissipation in friction is excitation of electron-hole pairs.
Energy dissipation throughexcitation of electron-hole pairs
(electronic friction)
++ +
- - -+
+ +
- - -+
+ +
- - -
Energy dissipation throughexcitation of electron-hole pairs
(electronic friction)
++ +
- - -+
+ +
- - -+
+ +
- - -
Energy dissipation throughexcitation and de-excitation of phonon (phononic
contribution)
EEW508VI. Mechanical Properties at Surfaces
the static friction coefficient (s) > kinetic friction coefficient (k)
This difference can lead to the stick-slip motion when the velocity v of the spring end B is small.
The force exerted by the spring on the slider, Fp, can be obtained from the length of spring.
In region 1, the pulling force Fp is smaller than the static friction force, s L and the slider sticks on the initial position
In region 2, Fp > s L, the slider begins to slip. If Fp is smaller than k L, the slider begins to slow down. At point b, the slider stops.
In region 3, the slider sticks on the surface
(a) An object is pulled by a spring. Ff is the friction force. (b) The pulling force Fp vs the displacement of B. stick-slip motion of the object is indicated by the sudden change of the pulling force
Stick-slip motion
EEW508VI. Mechanical Properties at Surfaces
Comparison between macrotribology and nano/microtribology
Macrotribology
Large massHeavy load
Wear (inevitable)
Bulk, materials
Nano/microtribology
Small massLight load
No wear (few atomic layers)
surface
EEW508VI. Mechanical Properties at Surfaces
Wear track Rotating
disk
Weight: 1N
Elastic arm
Friction force sensor
atomic/friction force microscopy
AFM and pin-on-disk tribometer on the sample specimen
Tools for tribological study
EEW508VI. Mechanical Properties at Surfaces
AB
DC
AB
DC
AB
DC
xyz actuator
4 quadrant photodiode
laser
cantilever
sample
V(A+C)-(B+D)
Lateral distance
quadrantphotodiode
Friction signal
A B
C D
A B
C D
Principle of friction force microscopy
AFM invented by Binnig, Quate, and Gerber in 1986AFM has a sharp tip with a radius between 10-100 nm, and the resolutions for the displacement and force sensing can be up to 0.01 nm and 0.1 pA.
Stick <-- slip
EEW508VI. Mechanical Properties at Surfaces
Topographical and friction images of SAM molecules on silicon
AFM topography friction
C16 silane
n typesilicon
SAM molecules are common lubricating materials to reduce friction on silicon devices
EEW508VI. Mechanical Properties at Surfaces
Singleasperity
Real contact
AFM
cont
act
are
a
[nm
]
A2
-150
externally applied load [nN]Fl
-100 -50 0 50
2000
4000
6000
Friction at the single asperity
Friction at the Macroscopic scale
Ff
Fn
F
L
Elementary mechanisms
DMT: Derjaguin-Müller-Toporon JKR:Johnson, Kendall and Roberts
Frictions at the different scale (nano versus macroscale)
EEW508VI. Mechanical Properties at Surfaces
FL
v
Contact area(A)
An object moving over a surface with a sliding velocity v. The friction force F is in the direction opposite to the sliding velocity v of the object
EEW508VI. Mechanical Properties at Surfaces