Many transition metal oxides belong to this class^[2] which may be subdivided according to their behavior, e.g. high-T_c, spintronic materials, multiferroics, Mott insulators, spin Peierls materials, heavy fermion materials, quasi-low-dimensional materials, etc. The single most intensively studied effect is probably high-temperature superconductivity in doped cuprates, e.g. La_2−xSr_xCuO₄. Other ordering or magnetic phenomena and temperature-induced phase transitions in many transition-metal oxides are also gathered under the term "strongly correlated materials."

Typically, strongly correlated materials have incompletely filled d- or f-electron shells with narrow energy bands. One can no longer consider any electron in the material as being in a "sea" of the averaged motion of the others (also known as mean field theory). Each single electron has a complex influence on its neighbors.

The term strong correlation refers to behavior of electrons in solids that is not well-described (often not even in a qualitatively correct manner) by simple one-electron theories such as the local-density approximation (LDA) of density-functional theory or Hartree–Fock theory. For instance, the seemingly simple material NiO has a partially filled 3d band (the Ni atom has 8 of 10 possible 3d-electrons) and therefore would be expected to be a good conductor. However, strong Coulomb repulsion (a correlation effect) between d electrons makes NiO instead a wide-band gap insulator. Thus, strongly correlated materials have electronic structures that are neither simply free-electron-like nor completely ionic, but a mixture of both.

Extensions to the LDA (LDA+U, GGA, SIC, GW, etc.) as well as simplified models Hamiltonians (e.g. Hubbard-like models) have been proposed and developed in order to describe phenomena that are due to strong electron correlation. Among them, dynamical mean field theory (DMFT) successfully captures the main features of correlated materials. Schemes that use both LDA and DMFT explain many experimental results in the field of correlated electrons.

Experimentally, optical spectroscopy, high-energy electron spectroscopies, resonant photoemission, and more recently resonant inelastic (hard and soft) X-ray scattering (RIXS) and neutron spectroscopy have been used to study the electronic and magnetic structure of strongly correlated materials. Spectral signatures seen by these techniques that are not explained by one-electron density of states are often related to strong correlation effects. The experimentally obtained spectra can be compared to predictions of certain models or may be used to establish constraints to the parameter sets. One has for instance established a classification scheme of transition metal oxides within the so-called Zaanen–Sawatzky–Allen diagram.^[3]

The manipulation and use of correlated phenomena has applications like superconducting magnets and in magnetic storage (CMR)^{[citation needed]} technologies. Other phenomena like the metal-insulator transition in VO₂ have been explored as a means to make smart windows to reduce the heating/cooling requirements of a room.^[4] Furthermore, metal-insulator transitions in Mott insulating materials like LaTiO₃ can be tuned through adjustments in band filling to potentially be used to make transistors that would use conventional field effect transistor configurations to take advantage of the material's sharp change in conductivity.^[5] Transistors using metal-insulator transitions in Mott insulators are often referred to as Mott transistors, and have been successfully fabricated using VO₂ before, but they have required the larger electric fields induced by ionic liquids as a gate material to operate.^[6]

• Electronic correlation
• Emergent behavior

• Anisimov, Vladimir; Yuri Izyumov (2010). Electronic Structure of Strongly Correlated Materials. Springer. ISBN 978-3-642-04825-8.
• Patrik Fazekas (1999). Lecture Notes on Electron Correlation and Magnetism. World Scientific. ISBN 978-9810224745.
• de Groot, Frank; Akio Kotani (2008). Core Level Spectroscopy of Solids. CRC Press. ISBN 978-0-8493-9071-5.
• Yamada, Kosaku (2004). Electron Correlations in Metals. Cambridge University Press. ISBN 978-0-521-57232-3.
• Robert Z. Bachrach, ed. (1992). Synchrotron radiation research : advances in surface and interface science. Plenum Press. ISBN 978-0-306-43872-1.
• Pavarini, Eva; Koch Erik; Vollhardt, Dieter; Lichtenstein, Alexander; (eds.) (2011). The LDA+DMFT approach to strongly correlated materials. Forschungszentrum Jülich. ISBN 978-3-89336-734-4. {{cite book}}: |author= has generic name (help)CS1 maint: multiple names: authors list (link)
• Amusia, M., Popov, K., Shaginyan, V., Stephanovich, V. (2014). Theory of Heavy-Fermion Compounds - Theory of Strongly Correlated Fermi-Systems. Springer Series in Solid-State Sciences. Vol. 182. Springer. doi:10.1007/978-3-319-10825-4. ISBN 978-3-319-10825-4.{{cite book}}: CS1 maint: multiple names: authors list (link)

• Quintanilla, Jorge; Hooley, Chris (June 2009). "The strong-correlations puzzle" (PDF). Physics World. 22 (6): 32–37. Bibcode:2009PhyW...22f..32Q. doi:10.1088/2058-7058/22/06/38.