Minimal model (physics)

In theoretical physics, a minimal model or Virasoro minimal model is a two-dimensional conformal field theory whose spectrum is built from finitely many irreducible representations of the Virasoro algebra. Minimal models have been classified and solved, and found to obey an ADE classification. ^[1] The term minimal model can also refer to a rational CFT based on an algebra that is larger than the Virasoro algebra, such as a W-algebra.

In minimal models, the central charge of the Virasoro algebra takes values of the type

${\displaystyle c=1-6{(p-q)^{2} \over pq}\ .}$

where ${\displaystyle p,q}$ are coprime integers such that ${\displaystyle p,q\geq 2}$. The conformal dimensions of degenerate representations are

${\displaystyle h_{r,s}(c)={\frac {(pr-qs)^{2}-(p-q)^{2}}{4pq}}\ ,\quad {\text{with}}\ r,s\in \mathbb {N} ^{*}\ ,}$

and they obey the identities

${\displaystyle h_{r,s}(c)=h_{q-r,p-s}(c)=h_{r+q,s+p}(c)\ .}$

The spectrums of minimal models are made of irreducible, degenerate lowest-weight representations of the Virasoro algebra, whose conformal dimensions are of the type ${\displaystyle h_{r,s}(c)}$ with

${\displaystyle 1\leq r\leq q-1\quad ,\quad 1\leq s\leq p-1\ .}$

Such a representation ${\displaystyle {\mathcal {R}}_{r,s}}$ is a coset of a Verma module by its infinitely many nontrivial submodules. It is unitary if and only if ${\displaystyle |p-q|=1}$. At a given central charge, there are ${\displaystyle {\frac {1}{2}}(p-1)(q-1)}$ distinct representations of this type. (Due to the relation ${\displaystyle h_{r,s}(c)=h_{q-r,p-s}(c)}$, each representation appears twice in the Kac table.) The set of these representations, or of their conformal dimensions, is called the Kac table with parameters ${\displaystyle (p,q)}$.

The following A-series minimal models are related to well-known physical systems:^[2]

• ${\displaystyle (p,q)=(3,2)}$ : trivial CFT,
• ${\displaystyle (p,q)=(5,2)}$ : Yang-Lee edge singularity,
• ${\displaystyle (p,q)=(4,3)}$ : Ising model at criticality,
• ${\displaystyle (p,q)=(5,4)}$ : tricritical Ising model.

The following D-series minimal models are related to well-known physical systems:

• ${\displaystyle (p,q)=(6,5)}$ : 3-state Potts model,
• ${\displaystyle (p,q)=(7,6)}$ : tricritical 3-state Potts model.

The Kac tables of these models, together with a few other Kac tables with ${\displaystyle 2\leq q\leq 6}$, are:

${\displaystyle {\begin{array}{c}{\begin{array}{c|cc}1&0&0\\\hline &1&2\end{array}}\\c_{3,2}=0\end{array}}\qquad {\begin{array}{c}{\begin{array}{c|cccc}1&0&-{\frac {1}{5}}&-{\frac {1}{5}}&0\\\hline &1&2&3&4\end{array}}\\c_{5,2}=-{\frac {22}{5}}\end{array}}}$

${\displaystyle {\begin{array}{c}{\begin{array}{c|ccc}2&{\frac {1}{2}}&{\frac {1}{16}}&0\\1&0&{\frac {1}{16}}&{\frac {1}{2}}\\\hline &1&2&3\end{array}}\\c_{4,3}={\frac {1}{2}}\end{array}}\qquad {\begin{array}{c}{\begin{array}{c|cccc}2&{\frac {3}{4}}&{\frac {1}{5}}&-{\frac {1}{20}}&0\\1&0&-{\frac {1}{20}}&{\frac {1}{5}}&{\frac {3}{4}}\\\hline &1&2&3&4\end{array}}\\c_{5,3}=-{\frac {3}{5}}\end{array}}}$

${\displaystyle {\begin{array}{c}{\begin{array}{c|cccc}3&{\frac {3}{2}}&{\frac {3}{5}}&{\frac {1}{10}}&0\\2&{\frac {7}{16}}&{\frac {3}{80}}&{\frac {3}{80}}&{\frac {7}{16}}\\1&0&{\frac {1}{10}}&{\frac {3}{5}}&{\frac {3}{2}}\\\hline &1&2&3&4\end{array}}\\c_{5,4}={\frac {7}{10}}\end{array}}\qquad {\begin{array}{c}{\begin{array}{c|cccccc}3&{\frac {5}{2}}&{\frac {10}{7}}&{\frac {9}{14}}&{\frac {1}{7}}&-{\frac {1}{14}}&0\\2&{\frac {13}{16}}&{\frac {27}{112}}&-{\frac {5}{112}}&-{\frac {5}{112}}&{\frac {27}{112}}&{\frac {13}{16}}\\1&0&-{\frac {1}{14}}&{\frac {1}{7}}&{\frac {9}{14}}&{\frac {10}{7}}&{\frac {5}{2}}\\\hline &1&2&3&4&5&6\end{array}}\\c_{7,4}=-{\frac {13}{14}}\end{array}}}$

${\displaystyle {\begin{array}{c}{\begin{array}{c|ccccc}4&3&{\frac {13}{8}}&{\frac {2}{3}}&{\frac {1}{8}}&0\\3&{\frac {7}{5}}&{\frac {21}{40}}&{\frac {1}{15}}&{\frac {1}{40}}&{\frac {2}{5}}\\2&{\frac {2}{5}}&{\frac {1}{40}}&{\frac {1}{15}}&{\frac {21}{40}}&{\frac {7}{5}}\\1&0&{\frac {1}{8}}&{\frac {2}{3}}&{\frac {13}{8}}&3\\\hline &1&2&3&4&5\end{array}}\\c_{6,5}={\frac {4}{5}}\end{array}}\qquad {\begin{array}{c}{\begin{array}{c|cccccc}4&{\frac {15}{4}}&{\frac {16}{7}}&{\frac {33}{28}}&{\frac {3}{7}}&{\frac {1}{28}}&0\\3&{\frac {9}{5}}&{\frac {117}{140}}&{\frac {8}{35}}&-{\frac {3}{140}}&{\frac {3}{35}}&{\frac {11}{20}}\\2&{\frac {11}{20}}&{\frac {3}{35}}&-{\frac {3}{140}}&{\frac {8}{35}}&{\frac {117}{140}}&{\frac {9}{5}}\\1&0&{\frac {1}{28}}&{\frac {3}{7}}&{\frac {33}{28}}&{\frac {16}{7}}&{\frac {15}{4}}\\\hline &1&2&3&4&5&6\end{array}}\\c_{7,5}={\frac {11}{35}}\end{array}}}$

${\displaystyle {\begin{array}{c}{\begin{array}{c|cccccc}5&5&{\frac {22}{7}}&{\frac {12}{7}}&{\frac {5}{7}}&{\frac {1}{7}}&0\\4&{\frac {23}{8}}&{\frac {85}{56}}&{\frac {33}{56}}&{\frac {5}{56}}&{\frac {1}{56}}&{\frac {3}{8}}\\3&{\frac {4}{3}}&{\frac {10}{21}}&{\frac {1}{21}}&{\frac {1}{21}}&{\frac {10}{21}}&{\frac {4}{3}}\\2&{\frac {3}{8}}&{\frac {1}{56}}&{\frac {5}{56}}&{\frac {33}{56}}&{\frac {85}{56}}&{\frac {23}{8}}\\1&0&{\frac {1}{7}}&{\frac {5}{7}}&{\frac {12}{7}}&{\frac {22}{7}}&5\\\hline &1&2&3&4&5&6\end{array}}\\c_{7,6}={\frac {6}{7}}\end{array}}}$

(Mention Runkel-Watts theory.)

This physics-related article is a stub. You can help Wikipedia by expanding it.

• v
• t
• e