Speaker
Prof.
Alexander Belavin
(Landau Institute for Theoretical Physics)
Description
I am going to present some results about (p,q) Minimal Liouville gravity.
It is assumed that the generating function of the correlators in genus zero in Minimal Liouville gravity (MLG) is nothing but logarithm of the Sato tau-function for dispersionless Gefand-Dikii hierarchy with the special initial condition given by Douglas string equation.
Using the connection between MLG and Frobenious manifold structure we get an explicit and useful expression for log Sato tau-function corresponding Douglas string equation in dispersionless limit.
We argue that the MLG correlators are the expansion coefficients of Log tau-function in respect to the new variables connected with KdV variables by a special noliniear "resonance" transformation in such a way that the MLG correlators satisfy to the necessary fusion rules.
Primary author
Prof.
Alexander Belavin
(Landau Institute for Theoretical Physics)