Virasoro algebra

The Virasoro algebra, denoted Vir, is an infinite-dimensional Lie algebra, defined as central extension of the complexification of the Lie algebra of vector fields on the circle. One may think of it as a deformed version of the Lie algebra for the group of orientation-preserving diffeomorphisms of the circle. The representation theory of Virasoro algebra is rich, and has diverse applications in Mathematics and Physics.

Vir is the Lie algebra over the field of complex numbers with the following generators:

• ${\displaystyle d_n}$ ,with n running through every integer,
• ${\displaystyle c}$

with the following relations:

• ${\displaystyle [d_n,c]=0}$,
• ${\displaystyle [d_m,d_n]=(m-n)d_{m+n}+{\delta }_{m+n}\frac{m^3-m}{12}c}$, with m and n each running through every integer

where ${\displaystyle {\delta }_{m+n}}$ is 1 when ${\displaystyle m+n=0}$ and is zero otherwise.

• Oscillator representations
• Verma modules
• Unitary representations
• Topic:Boson-Fermion correspondence
• Topic:Schur polynomials
• Kac determinant formula
• Sugawara construction
• Coset construction
• Weyl-Kac character formula

• Topic:KP hierarchy

• Topic:Affine Lie algebras

• Kac, V. G. and Raina, A. K.-- Highest Weight Representations of Infinite Dimensional Lie Algebras, Template:ISBN
• Frenkel and ben-Zvi, Vertex algebras and algebraic curves, Template:ISBN, p.41(definition), p.326(geometric description)
• Kac's article in Encyclopedia of Mathematics, Springer: [1]