Superconformal algebra: Difference between revisions
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In [[theoretical physics]], the '''minimal models''' are a very concrete well-defined type of [[rational conformal field theory]]. The individual minimal models are parameterized by two integers ''p,q'' that are moreover related for the unitary minimal models. | |||
==Classification== | |||
* <math> c = 1 - 6 {(p-q)^2 \over pq}</math> | |||
* <math> h = h_{r,s}(c) = {{(pr-qs)^2-(p-q)^2} \over 4pq}</math> | |||
These conformal field theories have a finite set of conformal families which close under fusion. However, generally these will not be unitary. Unitarity imposes the further restriction that q and p are related by q=m and p=m+1. | |||
:<math> c = 1-{6\over m(m+1)} = 0,\quad 1/2,\quad 7/10,\quad 4/5,\quad 6/7,\quad 25/28, \ldots</math> | |||
for ''m'' = 2, 3, 4, .... and ''h'' is one of the values | |||
:<math> h = h_{r,s}(c) = {((m+1)r-ms)^2-1 \over 4m(m+1)}</math> | |||
for ''r'' = 1, 2, 3, ..., ''m''−1 and ''s''= 1, 2, 3, ..., ''r''. | |||
The first few minimal models correspond to central charges and dimensions: | |||
*''m'' = 3: ''c'' = 1/2, ''h'' = 0, 1/16, 1/2. These 3 representations are related to the [[Ising model]] at criticality. The three operators correspond to the identity, spin and energy density respectively. | |||
*''m'' = 4: ''c'' = 7/10. ''h'' = 0, 3/80, 1/10, 7/16, 3/5, 3/2. These 6 give the scaling fields of the tri critical [[Ising model]]. | |||
*''m'' = 5: ''c'' = 4/5. These give the 10 fields of the 3-state [[Potts model]]. | |||
*''m'' = 6: ''c'' = 6/7. These give the 15 fields of the tri critical 3-state [[Potts model]]. | |||
==References== | |||
* P. Di Francesco, P. Mathieu, and D. Sénéchal, ''Conformal Field Theory'', [[Springer Science+Business Media|Springer-Verlag]], [[New York]], 1997. ISBN 0-387-94785-X. | |||
{{DEFAULTSORT:Minimal Models}} | |||
[[Category:Conformal field theory]] | |||
[[Category:Exactly solvable models]] | |||
{{Phys-stub}} | |||
Revision as of 11:57, 11 December 2012
In theoretical physics, the minimal models are a very concrete well-defined type of rational conformal field theory. The individual minimal models are parameterized by two integers p,q that are moreover related for the unitary minimal models.
Classification
These conformal field theories have a finite set of conformal families which close under fusion. However, generally these will not be unitary. Unitarity imposes the further restriction that q and p are related by q=m and p=m+1.
for m = 2, 3, 4, .... and h is one of the values
for r = 1, 2, 3, ..., m−1 and s= 1, 2, 3, ..., r.
The first few minimal models correspond to central charges and dimensions:
- m = 3: c = 1/2, h = 0, 1/16, 1/2. These 3 representations are related to the Ising model at criticality. The three operators correspond to the identity, spin and energy density respectively.
- m = 4: c = 7/10. h = 0, 3/80, 1/10, 7/16, 3/5, 3/2. These 6 give the scaling fields of the tri critical Ising model.
- m = 5: c = 4/5. These give the 10 fields of the 3-state Potts model.
- m = 6: c = 6/7. These give the 15 fields of the tri critical 3-state Potts model.
References
- P. Di Francesco, P. Mathieu, and D. Sénéchal, Conformal Field Theory, Springer-Verlag, New York, 1997. ISBN 0-387-94785-X.
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