Semiconductor Carrier Mobility
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In
solid-state physics Solid-state physics is the study of rigid matter, or solids, through methods such as quantum mechanics, crystallography, electromagnetism, and metallurgy. It is the largest branch of condensed matter physics. Solid-state physics studies how the l ...
, the electron mobility characterises how quickly an
electron The electron ( or ) is a subatomic particle with a negative one elementary electric charge. Electrons belong to the first generation of the lepton particle family, and are generally thought to be elementary particles because they have no kn ...
can move through a
metal A metal (from Greek μέταλλον ''métallon'', "mine, quarry, metal") is a material that, when freshly prepared, polished, or fractured, shows a lustrous appearance, and conducts electricity and heat relatively well. Metals are typicall ...
or
semiconductor A semiconductor is a material which has an electrical resistivity and conductivity, electrical conductivity value falling between that of a electrical conductor, conductor, such as copper, and an insulator (electricity), insulator, such as glas ...
when pulled by an
electric field An electric field (sometimes E-field) is the physical field that surrounds electrically charged particles and exerts force on all other charged particles in the field, either attracting or repelling them. It also refers to the physical field fo ...
. There is an analogous quantity for
holes A hole is an opening in or through a particular medium, usually a solid body. Holes occur through natural and artificial processes, and may be useful for various purposes, or may represent a problem needing to be addressed in many fields of en ...
, called hole mobility. The term carrier mobility refers in general to both electron and hole mobility. Electron and hole mobility are
special case In logic, especially as applied in mathematics, concept is a special case or specialization of concept precisely if every instance of is also an instance of but not vice versa, or equivalently, if is a generalization of . A limiting case is ...
s of electrical mobility of charged particles in a fluid under an applied electric field. When an electric field ''E'' is applied across a piece of material, the electrons respond by moving with an average velocity called the
drift velocity In physics, a drift velocity is the average velocity attained by charged particles, such as electrons, in a material due to an electric field. In general, an electron in a conductor will propagate randomly at the Fermi velocity, resulting in an a ...
, v_d. Then the electron mobility ''μ'' is defined as v_d = \mu E. Electron mobility is almost always specified in units of cm2/( Vs). This is different from the SI unit of mobility, m2/( Vs). They are related by 1 m2/(V⋅s) = 104 cm2/(V⋅s).
Conductivity Conductivity may refer to: *Electrical conductivity, a measure of a material's ability to conduct an electric current **Conductivity (electrolytic), the electrical conductivity of an electrolyte in solution **Ionic conductivity (solid state), elec ...
is proportional to the product of mobility and carrier concentration. For example, the same conductivity could come from a small number of electrons with high mobility for each, or a large number of electrons with a small mobility for each. For semiconductors, the behavior of
transistor upright=1.4, gate (G), body (B), source (S) and drain (D) terminals. The gate is separated from the body by an insulating layer (pink). A transistor is a semiconductor device used to Electronic amplifier, amplify or electronic switch, switch e ...
s and other devices can be very different depending on whether there are many electrons with low mobility or few electrons with high mobility. Therefore mobility is a very important parameter for semiconductor materials. Almost always, higher mobility leads to better device performance, with other things equal. Semiconductor mobility depends on the impurity concentrations (including donor and acceptor concentrations), defect concentration, temperature, and electron and hole concentrations. It also depends on the electric field, particularly at high fields when
velocity saturation Saturation velocity is the maximum velocity a charge carrier in a semiconductor, generally an electron, attains in the presence of very high electric fields. When this happens, the semiconductor is said to be in a state of velocity saturation. C ...
occurs. It can be determined by the
Hall effect The Hall effect is the production of a voltage difference (the Hall voltage) across an electrical conductor that is transverse to an electric current in the conductor and to an applied magnetic field perpendicular to the current. It was disco ...
, or inferred from transistor behavior.


Introduction


Drift velocity in an electric field

Without any applied electric field, in a solid,
electron The electron ( or ) is a subatomic particle with a negative one elementary electric charge. Electrons belong to the first generation of the lepton particle family, and are generally thought to be elementary particles because they have no kn ...
s and
holes A hole is an opening in or through a particular medium, usually a solid body. Holes occur through natural and artificial processes, and may be useful for various purposes, or may represent a problem needing to be addressed in many fields of en ...
move around randomly. Therefore, on average there will be no overall motion of charge carriers in any particular direction over time. However, when an electric field is applied, each electron or hole is accelerated by the electric field. If the electron were in a vacuum, it would be accelerated to ever-increasing velocity (called
ballistic transport In mesoscopic physics, ballistic conduction (ballistic transport) is the unimpeded flow (or transport) of charge carriers (usually electrons), or energy-carrying particles, over relatively long distances in a material. In general, the resistivity ...
). However, in a solid, the electron repeatedly scatters off
crystal defects A crystallographic defect is an interruption of the regular patterns of arrangement of atoms or molecules in Crystal, crystalline solids. The positions and orientations of particles, which are repeating at fixed distances determined by the Crysta ...
,
phonons In physics, a phonon is a collective excitation in a periodic, elastic arrangement of atoms or molecules in condensed matter, specifically in solids and some liquids. A type of quasiparticle, a phonon is an excited state in the quantum mechanic ...
, impurities, etc., so that it loses some energy and changes direction. The final result is that the electron moves with a finite average velocity, called the
drift velocity In physics, a drift velocity is the average velocity attained by charged particles, such as electrons, in a material due to an electric field. In general, an electron in a conductor will propagate randomly at the Fermi velocity, resulting in an a ...
. This net electron motion is usually much slower than the normally occurring random motion. The two charge carriers, electrons and holes, will typically have different drift velocities for the same electric field. Quasi-
ballistic transport In mesoscopic physics, ballistic conduction (ballistic transport) is the unimpeded flow (or transport) of charge carriers (usually electrons), or energy-carrying particles, over relatively long distances in a material. In general, the resistivity ...
is possible in solids if the electrons are accelerated across a very small distance (as small as the
mean free path In physics, mean free path is the average distance over which a moving particle (such as an atom, a molecule, or a photon) travels before substantially changing its direction or energy (or, in a specific context, other properties), typically as a ...
), or for a very short time (as short as the
mean free time Molecules in a fluid constantly collide with each other. The mean free time for a molecule in a fluid is the average time between collisions. The mean free path of the molecule is the product of the average speed and the mean free time. These conc ...
). In these cases, drift velocity and mobility are not meaningful.


Definition and units

The electron mobility is defined by the equation: v_d = \mu_e E. where: *''E'' is the
magnitude Magnitude may refer to: Mathematics *Euclidean vector, a quantity defined by both its magnitude and its direction *Magnitude (mathematics), the relative size of an object *Norm (mathematics), a term for the size or length of a vector *Order of ...
of the
electric field An electric field (sometimes E-field) is the physical field that surrounds electrically charged particles and exerts force on all other charged particles in the field, either attracting or repelling them. It also refers to the physical field fo ...
applied to a material, *''vd'' is the
magnitude Magnitude may refer to: Mathematics *Euclidean vector, a quantity defined by both its magnitude and its direction *Magnitude (mathematics), the relative size of an object *Norm (mathematics), a term for the size or length of a vector *Order of ...
of the electron drift velocity (in other words, the electron drift
speed In everyday use and in kinematics, the speed (commonly referred to as ''v'') of an object is the magnitude of the change of its position over time or the magnitude of the change of its position per unit of time; it is thus a scalar quanti ...
) caused by the electric field, and *''µ''e is the electron mobility. The hole mobility is defined by a similar equation: v_d = \mu_h E. Both electron and hole mobilities are positive by definition. Usually, the electron drift velocity in a material is directly proportional to the electric field, which means that the electron mobility is a constant (independent of the electric field). When this is not true (for example, in very large electric fields), mobility depends on the electric field. The SI unit of velocity is m/s, and the SI unit of electric field is V/ m. Therefore the SI unit of mobility is (m/s)/(V/m) = m2/( Vs). However, mobility is much more commonly expressed in cm2/(V⋅s) = 10−4 m2/(V⋅s). Mobility is usually a strong function of material impurities and temperature, and is determined empirically. Mobility values are typically presented in table or chart form. Mobility is also different for electrons and holes in a given material.


Derivation

Starting with
Newton's Second Law Newton's laws of motion are three basic laws of classical mechanics that describe the relationship between the motion of an object and the forces acting on it. These laws can be paraphrased as follows: # A body remains at rest, or in motion ...
: a = F/m_e^* where: *''a'' is the acceleration between collisions. *''F'' is the electric force exerted by the electric field, and *m_e^* is the effective mass of an electron. Since the force on the electron is −''eE'': a = -\frac This is the acceleration on the electron between collisions. The drift velocity is therefore: v_d = a \tau_c = -\fracE, where \tau_c is the
mean free time Molecules in a fluid constantly collide with each other. The mean free time for a molecule in a fluid is the average time between collisions. The mean free path of the molecule is the product of the average speed and the mean free time. These conc ...
Since we only care about how the drift velocity changes with the electric field, we lump the loose terms together to get v_d = -\mu_e E, where \mu_e = \frac Similarly, for holes we have v_d = \mu_h E, where \mu_h = \frac Note that both electron mobility and hole mobility are positive. A minus sign is added for electron drift velocity to account for the minus charge.


Relation to current density

The drift current density resulting from an electric field can be calculated from the drift velocity. Consider a sample with cross-sectional area A, length l and an electron concentration of n. The current carried by each electron must be -e v_d, so that the total current density due to electrons is given by: J_e=\frac = - e n v_d Using the expression for v_d gives J_e = e n\mu_e E A similar set of equations applies to the holes, (noting that the charge on a hole is positive). Therefore the current density due to holes is given by J_h =e p \mu_h E where p is the hole concentration and \mu_h the hole mobility. The total current density is the sum of the electron and hole components: J=J_e+J_h=(en\mu_e+ep\mu_h)E


Relation to conductivity

We have previously derived the relationship between electron mobility and current density J=J_e+J_h=(en\mu_e+ep\mu_h)E Now
Ohm's Law Ohm's law states that the current through a conductor between two points is directly proportional to the voltage across the two points. Introducing the constant of proportionality, the resistance, one arrives at the usual mathematical equat ...
can be written in the form J=\sigma E where \sigma is defined as the conductivity. Therefore we can write down: \sigma=en\mu_e+ep\mu_h which can be factorised to \sigma=e(n\mu_e+p\mu_h)


Relation to electron diffusion

In a region where n and p vary with distance, a diffusion current is superimposed on that due to conductivity. This diffusion current is governed by
Fick's Law Fick's laws of diffusion describe diffusion and were derived by Adolf Fick in 1855. They can be used to solve for the diffusion coefficient, . Fick's first law can be used to derive his second law which in turn is identical to the diffusion eq ...
: F=-D_\text\nabla n where: *''F'' is flux. *''D''e is the
diffusion coefficient Diffusivity, mass diffusivity or diffusion coefficient is a proportionality constant between the molar flux due to molecular diffusion and the gradient in the concentration of the species (or the driving force for diffusion). Diffusivity is enco ...
or diffusivity *\nabla n is the concentration gradient of electrons The diffusion coefficient for a charge carrier is related to its mobility by the Einstein relation: D_\text = \frac where: *''k''B is the
Boltzmann constant The Boltzmann constant ( or ) is the proportionality factor that relates the average relative kinetic energy of particles in a gas with the thermodynamic temperature of the gas. It occurs in the definitions of the kelvin and the gas constant, ...
*''T'' is the
absolute temperature Thermodynamic temperature is a quantity defined in thermodynamics as distinct from kinetic theory or statistical mechanics. Historically, thermodynamic temperature was defined by Kelvin in terms of a macroscopic relation between thermodynamic wor ...
*''e'' is the electric charge of an electron


Examples

Typical electron mobility at room temperature (300 K) in metals like
gold Gold is a chemical element with the symbol Au (from la, aurum) and atomic number 79. This makes it one of the higher atomic number elements that occur naturally. It is a bright, slightly orange-yellow, dense, soft, malleable, and ductile met ...
,
copper Copper is a chemical element with the symbol Cu (from la, cuprum) and atomic number 29. It is a soft, malleable, and ductile metal with very high thermal and electrical conductivity. A freshly exposed surface of pure copper has a pinkis ...
and
silver Silver is a chemical element with the Symbol (chemistry), symbol Ag (from the Latin ', derived from the Proto-Indo-European wikt:Reconstruction:Proto-Indo-European/h₂erǵ-, ''h₂erǵ'': "shiny" or "white") and atomic number 47. A soft, whi ...
is 30–50 cm2/ (V⋅s). Carrier mobility in semiconductors is doping dependent. In
silicon Silicon is a chemical element with the symbol Si and atomic number 14. It is a hard, brittle crystalline solid with a blue-grey metallic luster, and is a tetravalent metalloid and semiconductor. It is a member of group 14 in the periodic tab ...
(Si) the electron mobility is of the order of 1,000, in germanium around 4,000, and in gallium arsenide up to 10,000 cm2/ (V⋅s). Hole mobilities are generally lower and range from around 100 cm2/ (V⋅s) in gallium arsenide, to 450 in silicon, and 2,000 in germanium. Very high mobility has been found in several ultrapure low-dimensional systems, such as two-dimensional electron gases ( 2DEG) (35,000,000 cm2/(V⋅s) at low temperature),
carbon nanotubes A scanning tunneling microscopy image of a single-walled carbon nanotube Rotating single-walled zigzag carbon nanotube A carbon nanotube (CNT) is a tube made of carbon with diameters typically measured in nanometers. ''Single-wall carbon nan ...
(100,000 cm2/(V⋅s) at room temperature) and freestanding
graphene Graphene () is an allotrope of carbon consisting of a single layer of atoms arranged in a hexagonal lattice nanostructure.
(200,000 cm2/ V⋅s at low temperature).
Organic semiconductor Organic semiconductors are solids whose building blocks are pi-bonded molecules or polymers made up by carbon and hydrogen atoms and – at times – heteroatoms such as nitrogen, sulfur and oxygen. They exist in the form of molecular crystals or ...
s (
polymer A polymer (; Greek '' poly-'', "many" + ''-mer'', "part") is a substance or material consisting of very large molecules called macromolecules, composed of many repeating subunits. Due to their broad spectrum of properties, both synthetic a ...
,
oligomer In chemistry and biochemistry, an oligomer () is a molecule that consists of a few repeating units which could be derived, actually or conceptually, from smaller molecules, monomers.Quote: ''Oligomer molecule: A molecule of intermediate relativ ...
) developed thus far have carrier mobilities below 50 cm2/(V⋅s), and typically below 1, with well performing materials measured below 10.


Electric field dependence and velocity saturation

At low fields, the drift velocity ''v''''d'' is proportional to the electric field ''E'', so mobility ''μ'' is constant. This value of ''μ'' is called the ''low-field mobility''. As the electric field is increased, however, the carrier velocity increases sublinearly and asymptotically towards a maximum possible value, called the ''saturation velocity'' ''v''sat. For example, the value of ''v''sat is on the order of 1×107 cm/s for both electrons and holes in Si. It is on the order of 6×106 cm/s for Ge. This velocity is a characteristic of the material and a strong function of doping or impurity levels and temperature. It is one of the key material and semiconductor device properties that determine a device such as a transistor's ultimate limit of speed of response and frequency. This velocity saturation phenomenon results from a process called ''
optical phonon In physics, a phonon is a collective excitation in a periodic, elastic arrangement of atoms or molecules in condensed matter, specifically in solids and some liquids. A type of quasiparticle, a phonon is an excited state in the quantum mechani ...
scattering''. At high fields, carriers are accelerated enough to gain sufficient
kinetic energy In physics, the kinetic energy of an object is the energy that it possesses due to its motion. It is defined as the work needed to accelerate a body of a given mass from rest to its stated velocity. Having gained this energy during its accele ...
between collisions to emit an optical phonon, and they do so very quickly, before being accelerated once again. The velocity that the electron reaches before emitting a phonon is: \frac \approx \hbar \omega_\text where ''ω''phonon(opt.) is the optical-phonon angular frequency and m* the carrier effective mass in the direction of the electric field. The value of ''E''phonon (opt.) is 0.063 eV for Si and 0.034 eV for GaAs and Ge. The saturation velocity is only one-half of ''v''emit, because the electron starts at zero velocity and accelerates up to ''v''emit in each cycle. (This is a somewhat oversimplified description.) Velocity saturation is not the only possible high-field behavior. Another is the
Gunn effect A Gunn diode, also known as a transferred electron device (TED), is a form of diode, a two-terminal semiconductor electronic component, with negative resistance, used in high-frequency electronics. It is based on the "Gunn effect" discovered in 1 ...
, where a sufficiently high electric field can cause intervalley electron transfer, which reduces drift velocity. This is unusual; increasing the electric field almost always ''increases'' the drift velocity, or else leaves it unchanged. The result is
negative differential resistance In electronics, negative resistance (NR) is a property of some electrical circuits and devices in which an increase in voltage across the device's terminals results in a decrease in electric current through it. This is in contrast to an ordina ...
. In the regime of velocity saturation (or other high-field effects), mobility is a strong function of electric field. This means that mobility is a somewhat less useful concept, compared to simply discussing drift velocity directly.


Relation between scattering and mobility

Recall that by definition, mobility is dependent on the drift velocity. The main factor determining drift velocity (other than effective mass) is
scattering Scattering is a term used in physics to describe a wide range of physical processes where moving particles or radiation of some form, such as light or sound, are forced to deviate from a straight trajectory by localized non-uniformities (including ...
time, i.e. how long the carrier is ballistically accelerated by the electric field until it scatters (collides) with something that changes its direction and/or energy. The most important sources of scattering in typical semiconductor materials, discussed below, are ionized impurity scattering and acoustic phonon scattering (also called lattice scattering). In some cases other sources of scattering may be important, such as neutral impurity scattering, optical phonon scattering, surface scattering, and
defect A defect is a physical, functional, or aesthetic attribute of a product or service that exhibits that the product or service failed to meet one of the desired specifications. Defect, defects or defected may also refer to: Examples * Angular defec ...
scattering. Elastic scattering means that energy is (almost) conserved during the scattering event. Some elastic scattering processes are scattering from acoustic phonons, impurity scattering, piezoelectric scattering, etc. In acoustic phonon scattering, electrons scatter from state k to k', while emitting or absorbing a phonon of wave vector q. This phenomenon is usually modeled by assuming that lattice vibrations cause small shifts in energy bands. The additional potential causing the scattering process is generated by the deviations of bands due to these small transitions from frozen lattice positions.Ferry, David K. Semiconductor transport. London: Taylor & Francis, 2000. (hbk.), (pbk.)


Ionized impurity scattering

Semiconductors are doped with donors and/or acceptors, which are typically ionized, and are thus charged. The Coulombic forces will deflect an electron or hole approaching the ionized impurity. This is known as '' ionized impurity scattering''. The amount of deflection depends on the speed of the carrier and its proximity to the ion. The more heavily a material is doped, the higher the probability that a carrier will collide with an ion in a given time, and the smaller the
mean free time Molecules in a fluid constantly collide with each other. The mean free time for a molecule in a fluid is the average time between collisions. The mean free path of the molecule is the product of the average speed and the mean free time. These conc ...
between collisions, and the smaller the mobility. When determining the strength of these interactions due to the long-range nature of the Coulomb potential, other impurities and free carriers cause the range of interaction with the carriers to reduce significantly compared to bare Coulomb interaction. If these scatterers are near the interface, the complexity of the problem increases due to the existence of crystal defects and disorders. Charge trapping centers that scatter free carriers form in many cases due to defects associated with dangling bonds. Scattering happens because after trapping a charge, the defect becomes charged and therefore starts interacting with free carriers. If scattered carriers are in the inversion layer at the interface, the reduced dimensionality of the carriers makes the case differ from the case of bulk impurity scattering as carriers move only in two dimensions. Interfacial roughness also causes short-range scattering limiting the mobility of quasi-two-dimensional electrons at the interface.


Lattice (phonon) scattering

At any temperature above
absolute zero Absolute zero is the lowest limit of the thermodynamic temperature scale, a state at which the enthalpy and entropy of a cooled ideal gas reach their minimum value, taken as zero kelvin. The fundamental particles of nature have minimum vibration ...
, the vibrating atoms create pressure (acoustic) waves in the crystal, which are termed
phonon In physics, a phonon is a collective excitation in a periodic, Elasticity (physics), elastic arrangement of atoms or molecules in condensed matter physics, condensed matter, specifically in solids and some liquids. A type of quasiparticle, a phon ...
s. Like electrons, phonons can be considered to be particles. A phonon can interact (collide) with an electron (or hole) and scatter it. At higher temperature, there are more phonons, and thus increased electron scattering, which tends to reduce mobility.


Piezoelectric scattering

Piezoelectric effect can occur only in compound semiconductor due to their polar nature. It is small in most semiconductors but may lead to local electric fields that cause scattering of carriers by deflecting them, this effect is important mainly at low temperatures where other scattering mechanisms are weak. These electric fields arise from the distortion of the basic unit cell as strain is applied in certain directions in the lattice.


Surface roughness scattering

Surface roughness scattering caused by interfacial disorder is short range scattering limiting the mobility of quasi-two-dimensional electrons at the interface. From high-resolution transmission electron micrographs, it has been determined that the interface is not abrupt on the atomic level, but actual position of the interfacial plane varies one or two atomic layers along the surface. These variations are random and cause fluctuations of the energy levels at the interface, which then causes scattering.


Alloy scattering

In compound (alloy) semiconductors, which many thermoelectric materials are, scattering caused by the perturbation of crystal potential due to the random positioning of substituting atom species in a relevant sublattice is known as alloy scattering. This can only happen in ternary or higher alloys as their crystal structure forms by randomly replacing some atoms in one of the sublattices (sublattice) of the crystal structure. Generally, this phenomenon is quite weak but in certain materials or circumstances, it can become dominant effect limiting conductivity. In bulk materials, interface scattering is usually ignored.Ibach, Harald. ; Luth, Hans. Solid-state physics : an introduction to principles of materials science / Harald Ibach, Hans Luth. New York: Springer, 2009. -(Advanced texts in physics) .Bhattacharya, Pallab. Semiconductor optoelectronic devices / Pallab Bhattacharya. Upper Saddle River (NJ): Prentice-Hall, 1997. (nid.)Y. Takeda and T.P. Pearsall, "Failure of Mattheissen's Rule in the Calculation of Carrier Mobility and Alloy Scattering Effects in Ga0.47In0.53As", Electronics Lett. 17, 573-574 (1981).


Inelastic scattering

During inelastic scattering processes, significant energy exchange happens. As with elastic phonon scattering also in the inelastic case, the potential arises from energy band deformations caused by atomic vibrations. Optical phonons causing inelastic scattering usually have the energy in the range 30-50 meV, for comparison energies of acoustic phonon are typically less than 1 meV but some might have energy in order of 10 meV. There is significant change in carrier energy during the scattering process. Optical or high-energy acoustic phonons can also cause intervalley or interband scattering, which means that scattering is not limited within single valley.


Electron–electron scattering

Due to the Pauli exclusion principle, electrons can be considered as non-interacting if their density does not exceed the value 1016~1017 cm−3 or electric field value 103 V/cm. However, significantly above these limits electron–electron scattering starts to dominate. Long range and nonlinearity of the Coulomb potential governing interactions between electrons make these interactions difficult to deal with.


Relation between mobility and scattering time

A simple model gives the approximate relation between scattering time (average time between scattering events) and mobility. It is assumed that after each scattering event, the carrier's motion is randomized, so it has zero average velocity. After that, it accelerates uniformly in the electric field, until it scatters again. The resulting average drift mobility is: \mu = \frac\overline where ''q'' is the
elementary charge The elementary charge, usually denoted by is the electric charge carried by a single proton or, equivalently, the magnitude of the negative electric charge carried by a single electron, which has charge −1 . This elementary charge is a fundame ...
, ''m''* is the carrier effective mass, and is the average scattering time. If the effective mass is anisotropic (direction-dependent), m* is the effective mass in the direction of the electric field.


Matthiessen's rule

Normally, more than one source of scattering is present, for example both impurities and lattice phonons. It is normally a very good approximation to combine their influences using "Matthiessen's Rule" (developed from work by
Augustus Matthiessen Augustus Matthiessen, FRS (2 January 1831, in London – 6 October 1870, in London), the son of a merchant, was a British chemist and physicist who obtained his PhD in Germany at the University of Gießen in 1852 with Johann Heinrich Buff. He ...
in 1864): \frac = \frac + \frac. where ''µ'' is the actual mobility, \mu_ is the mobility that the material would have if there was impurity scattering but no other source of scattering, and \mu_ is the mobility that the material would have if there was lattice phonon scattering but no other source of scattering. Other terms may be added for other scattering sources, for example \frac = \frac + \frac + \frac + \cdots. Matthiessen's rule can also be stated in terms of the scattering time: \frac = \frac + \frac + \frac + \cdots . where ''τ'' is the true average scattering time and τimpurities is the scattering time if there was impurity scattering but no other source of scattering, etc. Matthiessen's rule is an approximation and is not universally valid. This rule is not valid if the factors affecting the mobility depend on each other, because individual scattering probabilities cannot be summed unless they are independent of each other. The average free time of flight of a carrier and therefore the relaxation time is inversely proportional to the scattering probability. For example, lattice scattering alters the average electron velocity (in the electric-field direction), which in turn alters the tendency to scatter off impurities. There are more complicated formulas that attempt to take these effects into account.


Temperature dependence of mobility

With increasing temperature, phonon concentration increases and causes increased scattering. Thus lattice scattering lowers the carrier mobility more and more at higher temperature. Theoretical calculations reveal that the mobility in
non-polar In chemistry, polarity is a separation of electric charge leading to a molecule or its chemical groups having an electric dipole moment, with a negatively charged end and a positively charged end. Polar molecules must contain one or more pola ...
semiconductors, such as silicon and germanium, is dominated by
acoustic phonon In physics, a phonon is a collective excitation in a periodic, elastic arrangement of atoms or molecules in condensed matter, specifically in solids and some liquids. A type of quasiparticle, a phonon is an excited state in the quantum mechanical ...
interaction. The resulting mobility is expected to be proportional to ''T'' −3/2, while the mobility due to optical phonon scattering only is expected to be proportional to ''T'' −1/2. Experimentally, values of the temperature dependence of the mobility in Si, Ge and GaAs are listed in table. As \frac\propto \left \langle v\right \rangle\Sigma , where \Sigma is the scattering cross section for electrons and holes at a scattering center and \left \langle v\right \rangle is a thermal average (Boltzmann statistics) over all electron or hole velocities in the lower conduction band or upper valence band, temperature dependence of the mobility can be determined. In here, the following definition for the scattering cross section is used: number of particles scattered into solid angle dΩ per unit time divided by number of particles per area per time (incident intensity), which comes from classical mechanics. As Boltzmann statistics are valid for semiconductors \left \langle v\right \rangle\sim\sqrt. For scattering from acoustic phonons, for temperatures well above Debye temperature, the estimated cross section Σph is determined from the square of the average vibrational amplitude of a phonon to be proportional to T. The scattering from charged defects (ionized donors or acceptors) leads to the cross section _\text\propto ^. This formula is the scattering cross section for "Rutherford scattering", where a point charge (carrier) moves past another point charge (defect) experiencing Coulomb interaction. The temperature dependencies of these two scattering mechanism in semiconductors can be determined by combining formulas for τ, Σ and \left \langle v\right \rangle, to be for scattering from acoustic phonons _\sim T^ and from charged defects _\text\sim T^. The effect of ionized impurity scattering, however, ''decreases'' with increasing temperature because the average thermal speeds of the carriers are increased. Thus, the carriers spend less time near an ionized impurity as they pass and the scattering effect of the ions is thus reduced. These two effects operate simultaneously on the carriers through Matthiessen's rule. At lower temperatures, ionized impurity scattering dominates, while at higher temperatures, phonon scattering dominates, and the actual mobility reaches a maximum at an intermediate temperature.


Disordered Semiconductors

While in crystalline materials electrons can be described by wavefunctions extended over the entire solid, this is not the case in systems with appreciable structural disorder, such as
polycrystalline A crystallite is a small or even microscopic crystal which forms, for example, during the cooling of many materials. Crystallites are also referred to as grains. Bacillite is a type of crystallite. It is rodlike with parallel longulites. Stru ...
or
amorphous In condensed matter physics and materials science, an amorphous solid (or non-crystalline solid, glassy solid) is a solid that lacks the long-range order that is characteristic of a crystal. Etymology The term comes from the Greek ''a'' ("wi ...
semiconductors.
Anderson Anderson or Andersson may refer to: Companies * Anderson (Carriage), a company that manufactured automobiles from 1907 to 1910 * Anderson Electric, an early 20th-century electric car * Anderson Greenwood, an industrial manufacturer * Anderson ...
suggested that beyond a critical value of structural disorder, electron states would be ''localized''. Localized states are described as being confined to finite region of real space, normalizable, and not contributing to transport. Extended states are spread over the extent of the material, not normalizable, and contribute to transport. Unlike crystalline semiconductors, mobility generally increases with temperature in disordered semiconductors.


Multiple trapping and release

Mott Mott is both an English surname and given name. Notable people with the name include: Surname B *Basil Mott (1859–1938), British civil engineer *Bitsy Mott (1918–2001), American baseball player C * Charles James Mott (1880–1918), British bar ...
later developed the concept of a mobility edge. This is an energy E_, above which electrons undergo a transition from localized to delocalized states. In this description, termed ''multiple trapping and release'', electrons are only able to travel when in extended states, and are constantly being trapped in, and re-released from, the lower energy localized states. Because the probability of an electron being released from a trap depends on its thermal energy, mobility can be described by an
Arrhenius relationship In chemical kinetics, an Arrhenius plot displays the logarithm of a reaction rate constant, ordinate axis) plotted against reciprocal of the temperature abscissa). Arrhenius plots are often used to analyze the effect of temperature on the rates o ...
in such a system: \mu=\mu_\exp\left(-\frac\right) where \mu_ is a mobility prefactor, E_\text is activation energy, k_\text is the Boltzmann constant, and T is temperature. The activation energy is typically evaluated by measuring mobility as a function of temperature. The
Urbach Energy The Urbach Energy, or Urbach Edge, is a parameter typically denoted E_, with dimensions of energy, used to quantify energetic disorder in the band edges of a semiconductor. It is evaluated by fitting the absorption coefficient as a function of energ ...
can be used as a proxy for activation energy in some systems.


Variable Range Hopping

At low temperature, or in system with a large degree of structural disorder (such as fully amorphous systems), electrons cannot access delocalized states. In such a system, electrons can only travel by tunnelling for one site to another, in a process called ''variable range hopping''. In the original theory of variable range hopping, as developed by Mott and Davis, the probability P_, of an electron hopping from one site i, to another site j, depends on their separation in space r_, and their separation in energy \Delta E_. P_ = P_\exp\left(-2\alpha r_ - \frac\right) Here P_ is a prefactor associated with the phonon frequency in the material, and \alpha is the wavefunction overlap parameter. The mobility in a system governed by variable range hopping can be shown to be: \mu=\mu_ \exp \left(-\left \frac \right \right) where \mu_ is a mobility prefactor, T_ is a parameter (with dimensions of temperature) that quantifies the width of localized states, and d is the dimensionality of the system.


Measurement of semiconductor mobility


Hall mobility

Carrier mobility is most commonly measured using the
Hall effect The Hall effect is the production of a voltage difference (the Hall voltage) across an electrical conductor that is transverse to an electric current in the conductor and to an applied magnetic field perpendicular to the current. It was disco ...
. The result of the measurement is called the "Hall mobility" (meaning "mobility inferred from a Hall-effect measurement"). Consider a semiconductor sample with a rectangular cross section as shown in the figures, a current is flowing in the ''x''-direction and a
magnetic field A magnetic field is a vector field that describes the magnetic influence on moving electric charges, electric currents, and magnetic materials. A moving charge in a magnetic field experiences a force perpendicular to its own velocity and to ...
is applied in the ''z''-direction. The resulting Lorentz force will accelerate the electrons (''n''-type materials) or holes (''p''-type materials) in the (−''y'') direction, according to the
right hand rule In mathematics and physics, the right-hand rule is a common mnemonic for understanding orientation of axes in three-dimensional space. It is also a convenient method for quickly finding the direction of a cross-product of 2 vectors. Most of th ...
and set up an electric field ''ξy''. As a result there is a voltage across the sample, which can be measured with a
high-impedance In electronics, high impedance means that a point in a circuit (a node) allows a relatively small amount of current through, per unit of applied voltage at that point. High impedance circuits are low current and potentially high voltage, whereas l ...
voltmeter. This voltage, ''VH'', is called the
Hall voltage The Hall effect is the production of a voltage difference (the Hall voltage) across an electrical conductor that is transverse to an electric current in the conductor and to an applied magnetic field perpendicular to the current. It was discove ...
. ''VH'' is negative for ''n''-type material and positive for ''p''-type material. Mathematically, the
Lorentz force In physics (specifically in electromagnetism) the Lorentz force (or electromagnetic force) is the combination of electric and magnetic force on a point charge due to electromagnetic fields. A particle of charge moving with a velocity in an elect ...
acting on a charge ''q'' is given by For electrons: \vec_ = -q(\vec_n \times \vec_z) For holes: \vec_ = +q(\vec_p \times \vec_z) In steady state this force is balanced by the force set up by the Hall voltage, so that there is no
net force Net Force may refer to: * Net force, the overall force acting on an object * ''NetForce'' (film), a 1999 American television film * Tom Clancy's Net Force, a novel series * Tom Clancy's Net Force Explorers Tom Clancy's Net Force Explorers or Ne ...
on the carriers in the ''y'' direction. For electrons, \vec_y = (-q)\vec_y + (-q) vec_n \times \vec_z= 0 \Rightarrow -q\xi_y + qv_xB_z = 0 \xi_y = v_xB_z For electrons, the field points in the −''y'' direction, and for holes, it points in the +''y'' direction. The electron current ''I'' is given by I = -qnv_xtW. Sub ''v''''x'' into the expression for ''ξ''''y'', \xi_y = -\frac = +\frac where ''RHn'' is the Hall coefficient for electron, and is defined as R_ = -\frac Since \xi_y = \frac R_ = -\frac = \frac Similarly, for holes R_ = \frac = \frac From the Hall coefficient, we can obtain the carrier mobility as follows: \begin \mu_n &= \left(-nq\right) \mu_n \left(-\frac\right) \\ &= -\sigma_n R_ \\ &= -\frac \end Similarly, \mu_p = \frac Here the value of ''VHp'' (Hall voltage), ''t'' (sample thickness), ''I'' (current) and ''B'' (magnetic field) can be measured directly, and the conductivities ''σ''n or ''σ''p are either known or can be obtained from measuring the resistivity.


Field-effect mobility

The mobility can also be measured using a
field-effect transistor The field-effect transistor (FET) is a type of transistor that uses an electric field to control the flow of current in a semiconductor. FETs (JFETs or MOSFETs) are devices with three terminals: ''source'', ''gate'', and ''drain''. FETs contro ...
(FET). The result of the measurement is called the "field-effect mobility" (meaning "mobility inferred from a field-effect measurement"). The measurement can work in two ways: From saturation-mode measurements, or linear-region measurements.. This reference mistakenly leaves out a factor of 1/VDS in eqn (2.11). The correct version of that equation can be found, e.g., in (See
MOSFET The metal–oxide–semiconductor field-effect transistor (MOSFET, MOS-FET, or MOS FET) is a type of field-effect transistor (FET), most commonly fabricated by the controlled oxidation of silicon. It has an insulated gate, the voltage of which d ...
for a description of the different modes or regions of operation.)


Using saturation mode

In this technique, for each fixed gate voltage VGS, the drain-source voltage VDS is increased until the current ID saturates. Next, the square root of this saturated current is plotted against the gate voltage, and the slope ''m''sat is measured. Then the mobility is: \mu = m_\text^2 \frac \frac where ''L'' and ''W'' are the length and width of the channel and ''C''''i'' is the gate insulator capacitance per unit area. This equation comes from the approximate equation for a MOSFET in saturation mode: I_D = \frac\frac(V_-V_)^2. where ''V''th is the threshold voltage. This approximation ignores the
Early effect The Early effect, named after its discoverer James M. Early, is the variation in the effective width of the base in a bipolar junction transistor (BJT) due to a variation in the applied base-to-collector voltage. A greater reverse bias across ...
(channel length modulation), among other things. In practice, this technique may underestimate the true mobility. "Extracting the field-effect mobility directly from the linear region of the output characteristic may yield larger values for the field-effect mobility than the actual one, since the drain current is linear only for very small VDS and large VG. In contrast, extracting the field-effect mobility from the saturated region might yield rather conservative values for the field-effect mobility, since the drain-current dependence from the gate-voltage becomes sub-quadratic for large VG as well as for small VDS."


Using the linear region

In this technique, the transistor is operated in the linear region (or "ohmic mode"), where VDS is small and I_D \propto V_ with slope ''m''lin. Then the mobility is: \mu = m_\text \frac \frac \frac. This equation comes from the approximate equation for a MOSFET in the linear region: I_D= \mu C_i \frac \left( (V_-V_)V_-\frac \right) In practice, this technique may overestimate the true mobility, because if VDS is not small enough and VG is not large enough, the MOSFET may not stay in the linear region.


Optical mobility

Electron mobility may be determined from non-contact laser
photo-reflectance technique Photo-reflectance is an optical technique for investigating the material and electronic properties of thin films. Photo-reflectance measures the change in reflectivity of a sample in response to the application of an amplitude modulated light beam. ...
measurements. A series of photo-reflectance measurements are made as the sample is stepped through focus. The electron diffusion length and recombination time are determined by a regressive fit to the data. Then the Einstein relation is used to calculate the mobility.


Terahertz mobility

Electron mobility can be calculated from time-resolved terahertz probe measurement.
Femtosecond laser Mode locking is a technique in optics by which a laser can be made to produce pulses of light of extremely short duration, on the order of picoseconds (10−12 s) or femtoseconds (10−15 s). A laser operated in this way is sometimes r ...
pulses excite the semiconductor and the resulting
photoconductivity Photoconductivity is an optical and electrical phenomenon in which a material becomes more electrically conductive due to the absorption of electromagnetic radiation such as visible light, ultraviolet light, infrared light, or gamma radiation. Wh ...
is measured using a terahertz probe, which detects changes in the terahertz electric field.


Time resolved microwave conductivity (TRMC)

A proxy for charge carrier mobility can be evaluated using time-resolved microwave conductivity (TRMC). A pulsed optical laser is used to create electrons and holes in a semiconductor, which are then detected as an increase in photoconductance. With knowledge of the sample absorbance, dimensions, and incident laser fluence, the parameter \phi\Sigma\mu=\phi(\mu_+\mu_) can be evaluated, where \phi is the carrier generation yield (between 0 and 1), \mu_ is the electron mobility and \mu_ is the hole mobility. \phi\Sigma\mu has the same dimensions as mobility, but carrier type (electron or hole) is obscured.


Doping concentration dependence in heavily-doped silicon

The
charge carrier In physics, a charge carrier is a particle or quasiparticle that is free to move, carrying an electric charge, especially the particles that carry electric charges in electrical conductors. Examples are electrons, ions and holes. The term is used ...
s in semiconductors are electrons and holes. Their numbers are controlled by the concentrations of impurity elements, i.e. doping concentration. Thus doping concentration has great influence on carrier mobility. While there is considerable scatter in the
experimental data Experimental data in science and engineering is data produced by a measurement, test method, experimental design or quasi-experimental design. In clinical research any data produced are the result of a clinical trial. Experimental data may be qua ...
, for noncompensated material (no counter doping) for heavily doped substrates (i.e. 10^\mathrm^ and up), the mobility in silicon is often characterized by the empirical relationship: \mu = \mu_o + \frac where ''N'' is the doping concentration (either ''ND'' or ''NA''), and ''N''ref and α are fitting parameters. At
room temperature Colloquially, "room temperature" is a range of air temperatures that most people prefer for indoor settings. It feels comfortable to a person when they are wearing typical indoor clothing. Human comfort can extend beyond this range depending on ...
, the above equation becomes: Majority carriers: \mu_n(N_D) = 65 + \frac \mu_p(N_A) = 48 + \frac Minority carriers: \mu_n(N_A) = 232 + \frac \mu_p(N_D) = 130 + \frac These equations apply only to silicon, and only under low field.


See also

*
Speed of electricity The word ''electricity'' refers generally to the movement of electrons (or other charge carriers) through a conductor in the presence of a potential difference or an electric field. The speed of this flow has multiple meanings. In everyday elect ...


References


External links


semiconductor glossary entry for electron mobilityResistivity and Mobility Calculator from the BYU Cleanroom
*Online lecture
Mobility
from an atomistic point of view {{Authority control Physical quantities Charge carriers Materials science Semiconductors Electric and magnetic fields in matter MOSFETs