Charge ordering

Charge ordering (CO) is a (first- or second-order) phase transition occurring mostly in strongly correlated materials such as transition metal oxides or organic conductors. Due to the strong interaction between electrons, charges are localized on different sites leading to a disproportionation and an ordered superlattice. It appears in different patterns ranging from vertical to horizontal stripes to a checkerboard–like pattern ^{[1] [2]} , and it is not limited to the two-dimensional case. The charge order transition is accompanied by symmetry breaking and may lead to ferroelectricity. It is often found in close proximity to superconductivity and colossal magnetoresistance.

Charge order patterns

This long range order phenomena was first discovered in magnetite (Fe₃O₄) by Verwey in 1939. ^{[3] [4]} He observed an increase of the electrical resistivity by two orders of magnitude at T_CO=120K, suggesting a phase transition which is now well known as the Verwey transition. He was the first to propose the idea of an ordering process in this context. The charge ordered structure of magnetite was solved in 2011 by a group led by Paul Attfield with the results published in Nature . ^[5] Periodic lattice distortions associated with charge order were later mapped in the manganite lattice to reveal striped domains containing topological disorder. ^[6]

Theoretical description

The extended one-dimensional Hubbard model delivers a good description of the charge order transition with the on-site and nearest neighbor Coulomb repulsion U and V. It emerged that V is a crucial parameter and important for developing the charge order state. Further model calculations try to take the temperature and an interchain interaction into account. ^[7] The extended Hubbard model for a single chain including inter-site and on-site interaction V and U as well as the parameter ${\displaystyle \delta _{d}}$ for a small dimerization which can be typically found in the (TMTTF)₂X compounds is presented as follows:

${\displaystyle H=-t\sum _{i}\sum _{\sigma }\left(\left[1+\left(-1\right)^{i}\delta _{d}\right]c_{i,\sigma }^{\dagger }c_{i+1,\sigma }+h.c\right)+U\sum _{i}n_{i,\uparrow }n_{i,\downarrow }+V\sum _{i}n_{i},n_{i+1}}$

where t describes the transfer integral or the kinetic energy of the electron and ${\displaystyle c_{i,\sigma }^{\dagger }}$ and ${\displaystyle c_{i+1,\sigma }}$ are the creation and annihilation operator, respectively, for an electron with the spin ${\displaystyle \sigma =\uparrow ,\downarrow }$ at the ${\displaystyle i}$th or ${\displaystyle i+1}$th site. ${\displaystyle n_{i,\downarrow ,\uparrow }}$ denotes the density operator. For non-dimerized systems, ${\displaystyle \delta _{d}}$ can be set to zero Normally, the on-site Coulomb repulsion U stays unchanged only t and V can vary with pressure.

Examples

Organic conductors

Organic conductors consist of donor and acceptor molecules building separated planar sheets or columns. The energy difference in the ionization energy acceptor and the electron affinity of the donor leads to a charge transfer and consequently to free carriers whose number is normally fixed. The carriers are delocalized throughout the crystal due to the overlap of the molecular orbitals being also reasonable for the high anisotropic conductivity. That is why it will be distinct between different dimensional organic conductors. They possess a huge variety of ground states, for instance, charge ordering, spin-Peierls, spin-density wave, antiferromagnetic state, superconductivity, charge-density wave to name only some of them. ^{[8] [9]}

Quasi-one-dimensional organic conductors

The model system of one-dimensional conductors is the Bechgaard-Fabre salts family, (TMTTF)₂X and (TMTSF)₂X, where in the latter one sulfur is substituted by selenium leading to a more metallic behavior over a wide temperature range and exhibiting no charge order. While the TMTTF compounds depending on the counterions X show the conductivity of a semiconductor at room temperature and are expected to be more one-dimensional than (TMTSF)₂X. ^[10] The transition temperature T_CO for the TMTTF subfamily was registered over two order of magnitudes for the centrosymmetric anions X = Br, PF₆, AsF₆, SbF₆ and the non-centrosymmetric anions X= BF₄ and ReO₄. ^[11] In the middle of the eighties, a new "structureless transition" was discovered by Coulon et al. ^[12] conducting transport and thermopower measurements. They observed a suddenly rise of the resistivity and the thermopower at T_CO while x-ray measurements showed no evidence for a change in the crystal symmetry or a formation of a superstructure. The transition was later confirmed by ¹³C-NMR ^[13] and dielectric measurements.

Different measurements under pressure reveal a decrease of the transition temperature T_CO by increasing the pressure. According to the phase diagram of that family, an increasing pressure applied to the TMTTF compounds can be understood as a shift from the semiconducting state (at room temperature) to a higher dimensional and metallic state as you can find for TMTSF compounds without a charge order state.

Anion X	TCO (K)
(TMTTF)2Br	28
(TMTTF)2PF6	70
(TMTTF)2AsF6	100.6
(TMTTF)2SbF6	154
(TMTTF)2BF4	83
(TMTTF)2ReO4	227.5
(DI-DCNQI)2Ag	220
TTM-TTPI3	120

Quasi-two-dimensional organic conductors

A dimensional crossover can be induced not only by applying pressure, but also be substituting the donor molecules by other ones. From a historical point of view, the main aim was to synthesize an organic superconductor with a high T_C. The key to reach that aim was to increase the orbital overlap in two dimension. With the BEDT-TTF and its huge π-electron system, a new family of quasi-two-dimensional organic conductors were created exhibiting also a great variety of the phase diagram and crystal structure arrangements.
At the turn of the 20th century, first NMR measurements on the θ-(BEDT-TTF)₂RbZn(SCN)₄ compound uncovered the known metal to insulator transition at T_CO= 195 K as an charge order transition. ^[14]

Compound	TCO (K)
α-(BEDT-TTF)2I3	135
θ-(BEDT-TTF)2TlCo(SCN)4	240
θ-(BEDT-TTF)2TlZn(SCN)4	165
θ-(BEDT-TTF)2RbZn(SCN)4	195
θ-(BEDT-TTF)2RbCo(SCN)4	190

Transition metal oxides

The most prominent transition metal oxide revealing a CO transition is the magnetite Fe₃O₄ being a mixed-valence oxide where the iron atoms have a statistical distribution of Fe³⁺ and Fe²⁺ above the transition temperature. Below 122 K, the combination of 2+ and 3+ species arrange themselves in a regular pattern, whereas above that transition temperature (also referred to as the Verwey temperature in this case) the thermal energy is large enough to destroy the order. ^[15]

Compound [16]	TCO (K)
Y0.5NiO3	582
YBaCo2O5	220
CaFeO3	290
Ba3NaRu2O9	210
TbBaFe2O5	282
Fe3O4	123
Li0.5MnO2	290
LaSrMn3O7	210
Na0.25Mn3O6	176
YBaMn2O6	498
TbBaMn2O6	473
PrCaMn2O6	230
α'-NaV2O5	34

Alkali metal oxides

The alkali metal oxides rubidium sesquioxide (Rb₄O₆) and caesium sesquioxide (Cs₄O₆) display charge ordering. ^[17]

Detection of charge order

• NMR spectroscopy is a powerful tool to measure the charge disproportionation. To apply this method to a certain system, it has to be doped with nuclei, for instance ¹³C as it is the case for TMTTF compounds, being active for NMR. The local probe nuclei are very sensitive to the charge on the molecule observable in the Knight shift K and the chemical shift D. The Knight shift K is proportional to the spin spin susceptibility χ_Sp on the molecule. The charge order or charge disproportionation appear as a splitting or broadening of the certain feature in the spectrum.
• The X-ray diffraction technique allows to determine the atomic position, but the extinction effect hinders to receive a high resolution spectrum. In the case of the organic conductors, the charge per molecule is measured by the change of the bond length of the C=C double bonds in the TTF molecule. A further problem arising by irradiating the organic conductors with x-rays is the destruction of the CO state. ^[18]
• In the organic molecules like TMTTF, TMTSF or BEDT-TFF, there are charge-sensitive modes changing their frequency depending on the local charge. Especially the C=C double bonds are quite sensitive to the charge. If a vibrational mode is infrared active or only visible in the Raman spectrum depends on its symmetry. In the case of BEDT-TTF, the most sensitive ones are the Raman active ν₃, ν₂ and the infrared out of phase mode ν₂₇. ^[19] Their frequency is linearly associated to the charge per molecule giving the opportunity to determine the degree of disproportionation.
• The charge order transition is also a metal to insulator transition being observable in transport measurements as a sharp rise in the resistivity. Transport measurements are therefore a good tool to get first evidences of a possible charge order transition.

References

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