Difference between revisions of "Band Regime versus Hopping Regime"
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The '''band regime''' and '''hopping regime''' are the two limiting systems for transport although there are variations of each. They represent two ways that electricity can be conducted through an organic molecule or material. | |||
In band regime the charge carrier ( | == Band regime versus Hopping regime == | ||
In band regime the charge carrier (wave function) is delocalized over the entire molecule or system. The delocalization over the whole system means there is only a probability of finding the charge carrier in any location. This results in coherent transport. In a sense the charge carrier has a “memory” of where it was before. | |||
In hopping regime there is a localized charge carrier on a single molecule and you can follow the movement of the charge from molecule to molecule or chain segment to chain segment. Depending on the geometry and orientation of crystals hopping may result in differing mobilities in different directions or when hopping between layers. | In hopping regime there is a localized charge carrier on a single molecule and you can follow the movement of the charge from molecule to molecule or chain segment to chain segment. Depending on the geometry and orientation of crystals hopping may result in differing mobilities in different directions or when hopping between layers. The band regime has the highest charge mobility and it is critical to understand the circumstances that encourage it. The transport is incoherent because each hop is random and has no correlation to the immediately preceding hop. | ||
'''Electronic coupling''' is large in the band regime and is the dominant factor. Whereas in the hopping regime coupling of charge carrier with vibrations, caused by geometry relaxations, is the dominant factor. In π conjugated systems with a charge localized somewhere on a chain or a molecule there will be a geometry relaxation around that charge leading to the formation of a [[phonon]]. A '''phonon''' is a mode of vibration in an ordered solid material or molecular substance that involve then entire lattice. | |||
Geometry relaxations can lead to intramolecular vibrations as well as intermolecular vibrations in which adjacent molecules move with respect to one another. | |||
{| class="wikitable" border ="1" | |||
|- | |||
! band regime | |||
! hopping regime | |||
|- | |||
| delocalization of the charge carrier wave functions | |||
| localization of the charge carrier wave functions | |||
|- | |||
| coherent transport | |||
| incoherent hops | |||
|- | |||
| electronic coupling | |||
| electron-phonon coupling- | |||
leading to geometry relaxations | |||
*intramolecular modes | |||
*intermolecular modes. | |||
|} | |||
See Chemical Reviews 2004<ref>Bredas, JL; Beljonne, D; Coropceanu, V; Cornil, J, "Charge-Transfer And Energy-Transfer Processes In Pi-Conjugated Oligomers And Polymers: A Molecular Picture, Chemical Reviews, 104, 4971-5003 {{Doi|10.1021/cr040084k}}</ref> | |||
See Chemical Reviews 2007<ref>Chemical Reviews 107, 926-952 (2007)</ref> | |||
See Wikipedia [http://en.wikipedia.org/wiki/Organic_semiconductor Organic Semiconductor] | |||
=== Requirements for Band Regime === | |||
In order to achieve a band regime (which has the largest carrier mobility) you must have a highly ordered structure or single crystal with few impurities. Low temperature is required because vibrations in adjacent coupled molecules due to temperature will decrease the electronic coupling and therefore decrease the mobility. For this reason mobility decreases with increasing temperature. In the case of methyl, which has a high charge carrier density, the decrease in mobility means the conductivity also decreases with temperature. The increase in intermolecular and intramolecular vibrations has generally a negative impact on the mobility of charge carriers. | |||
The second requirement for a band regime is the well ordered structure provides a large electronic coupling between adjacent sites on adjacent molecules or polymer repeat units. In a perfectly ordered polyacetylene the wave functions for the charge carriers are delocalized over the whole system. The presence of polarons and solitons means there must not be a perfect crystalline structure because these polaronic structures are associated with a geometry relaxation of the system. Charge polarons and solitons dissappear when there is complete delocalization. Polysulfur nitride ((SN)<sub>x</sub>) has crystals with strong interactions between the chains and no distortions. As a result there are no solitons. Normally samples of polyacetylene and transpolyacetylene are somewhat disordered and soliton and polaron behavior is observed. | |||
The second requirement for a band regime is the well ordered structure provides a large electronic coupling between adjacent sites on adjacent molecules or polymer repeat units. In a perfectly ordered polyacetylene the | |||
== Evidence for band regime vs hopping regime == | == Evidence for band regime vs hopping regime == | ||
=== | === Time domain === | ||
In the time domain the typical residence time t of a charge carrier on a site in a molecular materials or polymer repeat chain is described by an Heisenberg-like equation: | In the time domain the typical residence time t of a charge carrier on a site in a molecular materials or polymer repeat chain is described by an Heisenberg-like equation: | ||
:<math>\tau \approx \frac {\hbar} {W} \rightarrow \tau \approx \frac {2}{3} \frac {10^{-15}} {W_{(eV)}} S\,\!</math> | |||
Where | Where: | ||
:<math>\tau\,\!</math> is the residence time on a unit | |||
:<math>\hbar\,\!</math> is the period in the Heisenberg uncertainty principle equation | |||
W is the bandwidth | :<math>W\,\!</math> is the bandwidth | ||
The wider the bandwidth the larger the electronic coupling between adjacent units. | The wider the bandwidth the larger the electronic coupling between adjacent units. | ||
If W, the conduction bandwidth (for electrons) (and, or) the valance bandwidth (for holes) is large enough (.2-.3 eV) then tau is shorter than 10-13 s | If W, the conduction bandwidth (for electrons) (and, or) the valance bandwidth (for holes) is large enough (.2-.3 eV) then τ is shorter than 10<sup>-13</sup> s and this means band transport is possible. | ||
This is because the carrier will not “sit” long enough on any single molecule for that molecule to have time to geometrically relax (relaxaton for C-C requires 20 ms) making band transport possible. | This is because the carrier will not “sit” long enough on any single molecule for that molecule to have time to geometrically relax (relaxaton for C-C requires 20 ms) thus making band transport possible. | ||
In a simple tight-binding approximation: | In a simple tight-binding approximation: | ||
W = 4 | :<math>W = 4 \cdot t\,\!</math> | ||
where: | |||
:<math>t\,\!</math> is the electronic coupling between adjacent sites or adjacent repeating units. T is can also be called the transfer integral or the resonance integral Β(in Hückel terminology), or tunneling matrix element (in physics). | |||
=== Energy Domain === | === Energy Domain === | ||
There are two possibilities from an energy perspective. The charge carrier can fully delocalize along the system in which case there is no geometry relaxation and the energy gained by electronic coupling and charge carrier delocalization is larger than the energy gained by electron-phonon coupling (geometry relaxations around the charge) leading to charge carrier localization and polaron formation. In delocalization pi electrons from several isolated orbitals contribute to form a filled lower energy valence band and an empty higher energy conduction band. Thus the energy was lowered by delocalization. | There are two possibilities from an energy perspective. The charge carrier can fully delocalize along the system in which case there is no geometry relaxation and the energy gained by electronic coupling and charge carrier delocalization is larger than the energy gained by electron-phonon coupling (geometry relaxations around the charge) leading to charge carrier localization and polaron formation. In delocalization π electrons from several isolated orbitals contribute to form a filled lower energy valence band and an empty higher energy conduction band. Thus the energy was lowered by delocalization. If the energy gained the electronic coupling and charge carrier delocalization is larger than the energy gained by electron-phonon coupling (geometry relaxations around the charge) leading to charge carrier localization and polaron formation, then the band regime is favored. In Marcus theory this is called minimizing the reorganization of the energy of the system. | ||
However if more energy is gained by geometry relaxation then the hopping regime is favored. | However if more energy is gained by geometry relaxation then the hopping regime is favored. | ||
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Lattice modes have frequency of 50-200 wavenumbers whereas intramolecular C-C stretch can have wavenumbers of 1500-1600. Phonon modes have 20-50 times less energy than intramolecular modes. As temperature in the system increases the phonon mode of vibration are the first to be excited. The frequency is lower so they are 20-50 times slower than a C-C bond stretch. In addition the higher temperature decreases the electronic coupling and increases localization. | Lattice modes have frequency of 50-200 wavenumbers whereas intramolecular C-C stretch can have wavenumbers of 1500-1600. Phonon modes have 20-50 times less energy than intramolecular modes. As temperature in the system increases the phonon mode of vibration are the first to be excited. The frequency is lower so they are 20-50 times slower than a C-C bond stretch. In addition the higher temperature decreases the electronic coupling and increases localization. | ||
== References == | |||
<references/> | |||
[[category:transport properties]] | |||
<table id="toc" style="width: 100%"> | <table id="toc" style="width: 100%"> | ||
<tr> | <tr> |
Latest revision as of 15:11, 10 August 2010
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The band regime and hopping regime are the two limiting systems for transport although there are variations of each. They represent two ways that electricity can be conducted through an organic molecule or material.
Band regime versus Hopping regime
In band regime the charge carrier (wave function) is delocalized over the entire molecule or system. The delocalization over the whole system means there is only a probability of finding the charge carrier in any location. This results in coherent transport. In a sense the charge carrier has a “memory” of where it was before.
In hopping regime there is a localized charge carrier on a single molecule and you can follow the movement of the charge from molecule to molecule or chain segment to chain segment. Depending on the geometry and orientation of crystals hopping may result in differing mobilities in different directions or when hopping between layers. The band regime has the highest charge mobility and it is critical to understand the circumstances that encourage it. The transport is incoherent because each hop is random and has no correlation to the immediately preceding hop.
Electronic coupling is large in the band regime and is the dominant factor. Whereas in the hopping regime coupling of charge carrier with vibrations, caused by geometry relaxations, is the dominant factor. In π conjugated systems with a charge localized somewhere on a chain or a molecule there will be a geometry relaxation around that charge leading to the formation of a phonon. A phonon is a mode of vibration in an ordered solid material or molecular substance that involve then entire lattice.
Geometry relaxations can lead to intramolecular vibrations as well as intermolecular vibrations in which adjacent molecules move with respect to one another.
band regime | hopping regime |
---|---|
delocalization of the charge carrier wave functions | localization of the charge carrier wave functions |
coherent transport | incoherent hops |
electronic coupling | electron-phonon coupling-
leading to geometry relaxations
|
See Chemical Reviews 2004[1]
See Chemical Reviews 2007[2]
See Wikipedia Organic Semiconductor
Requirements for Band Regime
In order to achieve a band regime (which has the largest carrier mobility) you must have a highly ordered structure or single crystal with few impurities. Low temperature is required because vibrations in adjacent coupled molecules due to temperature will decrease the electronic coupling and therefore decrease the mobility. For this reason mobility decreases with increasing temperature. In the case of methyl, which has a high charge carrier density, the decrease in mobility means the conductivity also decreases with temperature. The increase in intermolecular and intramolecular vibrations has generally a negative impact on the mobility of charge carriers.
The second requirement for a band regime is the well ordered structure provides a large electronic coupling between adjacent sites on adjacent molecules or polymer repeat units. In a perfectly ordered polyacetylene the wave functions for the charge carriers are delocalized over the whole system. The presence of polarons and solitons means there must not be a perfect crystalline structure because these polaronic structures are associated with a geometry relaxation of the system. Charge polarons and solitons dissappear when there is complete delocalization. Polysulfur nitride ((SN)x) has crystals with strong interactions between the chains and no distortions. As a result there are no solitons. Normally samples of polyacetylene and transpolyacetylene are somewhat disordered and soliton and polaron behavior is observed.
Evidence for band regime vs hopping regime
Time domain
In the time domain the typical residence time t of a charge carrier on a site in a molecular materials or polymer repeat chain is described by an Heisenberg-like equation:
- <math>\tau \approx \frac {\hbar} {W} \rightarrow \tau \approx \frac {2}{3} \frac {10^{-15}} {W_{(eV)}} S\,\!</math>
Where:
- <math>\tau\,\!</math> is the residence time on a unit
- <math>\hbar\,\!</math> is the period in the Heisenberg uncertainty principle equation
- <math>W\,\!</math> is the bandwidth
The wider the bandwidth the larger the electronic coupling between adjacent units.
If W, the conduction bandwidth (for electrons) (and, or) the valance bandwidth (for holes) is large enough (.2-.3 eV) then τ is shorter than 10-13 s and this means band transport is possible.
This is because the carrier will not “sit” long enough on any single molecule for that molecule to have time to geometrically relax (relaxaton for C-C requires 20 ms) thus making band transport possible.
In a simple tight-binding approximation:
- <math>W = 4 \cdot t\,\!</math>
where:
- <math>t\,\!</math> is the electronic coupling between adjacent sites or adjacent repeating units. T is can also be called the transfer integral or the resonance integral Β(in Hückel terminology), or tunneling matrix element (in physics).
Energy Domain
There are two possibilities from an energy perspective. The charge carrier can fully delocalize along the system in which case there is no geometry relaxation and the energy gained by electronic coupling and charge carrier delocalization is larger than the energy gained by electron-phonon coupling (geometry relaxations around the charge) leading to charge carrier localization and polaron formation. In delocalization π electrons from several isolated orbitals contribute to form a filled lower energy valence band and an empty higher energy conduction band. Thus the energy was lowered by delocalization. If the energy gained the electronic coupling and charge carrier delocalization is larger than the energy gained by electron-phonon coupling (geometry relaxations around the charge) leading to charge carrier localization and polaron formation, then the band regime is favored. In Marcus theory this is called minimizing the reorganization of the energy of the system.
However if more energy is gained by geometry relaxation then the hopping regime is favored.
In molecular materials we distinguish between intramolecular vibrations for instance the stretching of a C-C in a pentacene molecule (which is not not affected by adjacent molecules) and intermolecular vibrations (phonons) which propagate across an entire lattice.
Lattice modes have frequency of 50-200 wavenumbers whereas intramolecular C-C stretch can have wavenumbers of 1500-1600. Phonon modes have 20-50 times less energy than intramolecular modes. As temperature in the system increases the phonon mode of vibration are the first to be excited. The frequency is lower so they are 20-50 times slower than a C-C bond stretch. In addition the higher temperature decreases the electronic coupling and increases localization.
References
- ↑ Bredas, JL; Beljonne, D; Coropceanu, V; Cornil, J, "Charge-Transfer And Energy-Transfer Processes In Pi-Conjugated Oligomers And Polymers: A Molecular Picture, Chemical Reviews, 104, 4971-5003 doi:10.1021/cr040084k
- ↑ Chemical Reviews 107, 926-952 (2007)
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