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What is the BCS theory?
Almost 50 years passed before the physicists John Bardeen, Leon Cooper and Robert Schrieffer (Nobel Prize in Physics, 1972) were able to present a theory (the BCS theory, named after the initials of their surnames) that explained the phenomenon. This theory shows that some of the negatively-charged electrons in a superconductor form pairs, called Cooper pairs. These pairs of electrons flow along attracting channels formed by the regular structure of the positively-charged metal atoms in the material. As a result of this combination and interaction the current can flow evenly and superconductivity occurs. The paired electrons are usually thought of as a condensate, similar to the drops of liquid that form in a cooled gas. Unlike an ordinary liquid this “electronic liquid” is superconductive.
These superconductors are called type-I. They are metals and are characterised by the Meissner effect, that is, in the superconductive state they actively counteract a surrounding magnetic field as long as its strength does not exceed a certain limit (fig. 1). If the surrounding magnetic field becomes too strong, the superconductive property disappears.
But it is known that there are superconductors that lack or show only a partial Meissner effect. These are in general alloys of various metals or compounds consisting of non-metals and copper. These retain their superconductive property even in a strong magnetic field. Experiments show that the properties of these so-called type-II superconductors cannot be described by the BCS theory.
Originally posted by meteor
So what's actually the most accepted theory to explain superconductivity? RVB theory?
The theory Abrikosov's argument was based on was formulated in the early 1950s by Vitaly Ginzburg and Lev Landau (the latter was awarded the Nobel Prize in Physics in 1962 for other work, see below). This theory was intended to describe superconductivity and critical magnetic field strengths in the superconductors that were known at that time. Ginzburg and Landau realized that an order parameter (wave function) describing the density of the superconductive condensate in the material had to be introduced if the interaction between the superconductor and magnetism was to be explained. When this parameter was introduced, it was evident that there was a breakpoint when a characteristic value approximately 0.71 was reached and that in principle there were two types of superconductor. For mercury the value is approximately 0.16 and other superconductors known at the time have values close to this. There was therefore, at that time, no reason to consider values above the breakpoint. Abrikosov was able to tie up the theory by showing that type-II superconductors had precisely these values.
Originally posted by meteor
Is possible that Green was talking about BPS states? I know that BPS states appear in string theory, but I'm not aware of any connection between BCS theory and string theory
Originally posted by Dimitri Terryn
So soliton theory plays an important role in String/M-theory? That's nice to know, because at the theoretical physics department at my university, they mainly focus on String and soliton theory...
Originally posted by ZapperZ
re: RVB theory. I do not believe it is considered as the most widely accepted theory, at least not for the high-Tc superconductors. In fact, there are a number of experimental evidence that appears to contradict RVB predictions. The current champion of RVB theory is Phil Anderson of Princeton. A preprint by him appeared recently in the e-print archive at
http://arxiv.org/abs/cond-mat/0311467
However, it didn't take long for dissenting views of this to appear. See
http://arxiv.org/abs/cond-mat/0312385
I have attended many conferences in which RVB scenario isn't "widely accepted". There are still major problems with it.
re: BCS Theory. It is incorrect to say that BCS theory doesn't work for Type II conventional superconductors. The work of Abrikosov was on just that, the extension of BCS theory to account for these material. In fact, the BCS theory is so powerful that Tony Leggett was able to show that it also can be extended to not only superfluid He4, but also to He3. Both Abrikosov and Leggett, along with Vitaly Ginzburg won the 2003 Physics Nobel prize.
Zz.
Originally posted by roch
BCS theory states that Superconductivity occurs through the formation of "Cooper" pairs: At low temperature, electrons starts to attract each other via lattice vibration (phonons) and form pairs, i.e. electron orbits around each other. Now, the "speed" of rotation of one pair is characterized by a number: L=0 (s-wave superconductors), L=1 (p-wave superconductors), L=2 (d-wave superconductor), etc...
The BCS theory works perfectly well for so-called "conventional" superconductors which are S-wave type (L=0) and which can be Type-I OR type-II superconductors.
The difference between type-I and type-II supercondcutors is given by their response to an external magnetic field: A type-I superconductor does NOT let any external magnetic field penetrates its body while a type-II superconductor can PARTIALLY let a external magnetic field penetrates its body.
Originally posted by ZapperZ
I'm not disputing that RVB theory is an alternative. I am disputing that it is "widely accepted". Nothing that I have seen so far would indicate that the community are moving in this direction.
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Zz.
The BCS theory, also known as the Bardeen-Cooper-Schrieffer theory, is a theory in condensed matter physics that explains the phenomenon of superconductivity. It was proposed in 1957 by John Bardeen, Leon N. Cooper, and John Robert Schrieffer and has since been widely accepted as the explanation for superconductivity.
Superconductivity is the phenomenon where certain materials, when cooled below a certain temperature, exhibit zero electrical resistance and the expulsion of magnetic fields. This allows for the efficient transport of electricity and has many practical applications, such as in MRI machines and power transmission lines.
The BCS theory explains superconductivity by proposing that at low temperatures, electrons in a superconducting material form pairs due to the attractive force between them and are able to move through the material without experiencing resistance. This is known as the Cooper pair mechanism and is made possible by the interaction between the electrons and the lattice vibrations of the material.
The BCS theory is limited in its ability to explain certain types of superconductivity, such as high-temperature superconductivity, which occurs at temperatures above the critical temperature predicted by the BCS theory. It also does not take into account the effects of disorder and impurities in the material, which can affect the superconducting properties.
The BCS theory has led to the development of practical applications in the field of superconductivity, such as the development of superconducting magnets for use in MRI machines and particle accelerators. It has also led to advancements in power transmission and storage, as well as in the field of quantum computing.