Aug 6 2010
Physicists are divided on whether string theory is a viable theory of everything, but many agree that it offers a new way to look at physical phenomena that have otherwise proven difficult to describe.
In the past decade, physicists have used string theory to build a connection between quantum and gravitational mechanics, known as gauge/gravity duality.
MIT physicists, led by Hong Liu and John McGreevy, have now used that connection to describe a specific physical phenomenon — the behavior of a type of high-temperature superconductor, or a material that conducts electricity with no resistance. The research, published in the Aug. 5 online edition of Science, is one of the first to show that gauge/gravity duality can shed light on a material's puzzling physical behavior.
So far, the team has described a few aspects of behavior of a type of superconducting materials called cuprates. However, the researchers hope their work could lead to more general theories to describe other materials, and eventually predict their behavior. "That's the ultimate theoretical goal, and we haven't really achieved that," says Liu.
MIT graduate student Nabil Iqbal and recent PhD recipients Thomas Faulkner and David Vegh are also authors of the paper.
In 1986, physicists discovered that cuprates (ceramic compounds that contain copper) can superconduct at relatively high temperatures (up to 135 degrees Celsius above absolute zero).
At the atomic level, cuprates are classified as a "many-body system" — essentially a vast collection of electrons that interact with each other. Such systems are usually described using quantum mechanics. However, so far, physicists have found it difficult to describe cuprates, because their behavior is so different from other materials. Understanding that behavior could help physicists find new materials that superconduct at even higher temperatures. These new materials would have potentially limitless applications.
Unlike most materials, cuprates do not obey Fermi's laws, a set of quantum-mechanics principles that govern microscopic behavior at very low temperatures (close to absolute zero, or -273 degrees Celsius). Instead, cuprates become superconductors. Just above the temperature at which they begin to superconduct, they enter a state called the "strange metal" state.
In this study, the researchers focused on two properties that distinguish those cuprate strange metals from Fermi liquids. In ordinary Fermi liquids, electrical resistivity and the rates of electron scattering (deflection from their original course caused by interactions with each other) are both proportional to the temperature squared. However, in cuprates (and other superconducting non-Fermi liquids), electron scattering and resistivity are proportional to the temperature. "There's really no theory of how to explain that," says Liu.
Using gauge/gravity duality — the connection between quantum and gravitational mechanics — the MIT team identified a system that has the same unusual properties as strange metals, but could be explained by gravitational mechanics. In this case, the model they used was a gravitational system with a black hole. "It's a mathematical abstraction which we hope may shed light on the physics of the real system," says Liu. In their model, they can study behavior at high and low energy (determined by how the excitation energy of a single electron compares to the average energy of an electron in the system), and it turns out that at low energy, the black-hole model exhibits many of the same unusual traits seen in non-Fermi liquids such as cuprates.
For example, in both systems, when an electron at the lowest possible energy level is excited (by a photon or another particle), the resulting interaction between the electron and the hole left behind cannot be described as a quasiparticle (as it can in ordinary metals), because the electron excitation decays so quickly. (The electrons decay so quickly because their scattering rate is proportional to the temperature.) Furthermore, the electrical resistance of the black-hole system is directly proportional to temperature — just as it is in cuprates.
Source: http://web.mit.edu/