Regular solutions of the Liouville equation with boundary conditions

Publisher Website

15 July 1983

journal article
research article
Published by American Physical Society (APS) in Physical Review D

Vol. 28 (2) , 391-395
https://doi.org/10.1103/physrevd.28.391

Abstract

We show that the solutions to the Liouville equation with the boundary condition

\partial_{n} φ + ρ \sqrt{2} \exp (\frac{φ}{2}) = 0

proposed by Gervais and Neveu, arising from Polyakov's quantum string, are regular only for

0 < ρ < 1

.

Keywords

This publication has 11 references indexed in Scilit:

Solution of Toda systems
Nuclear Physics B, 1982
Polyakov's quantized string with boundary terms (II)
Nuclear Physics B, 1982
The dual string spectrum in Polyakov's quantization (I)
Nuclear Physics B, 1982
Polyakov's quantized string with boundary terms
Nuclear Physics B, 1982
Dual models as saddle point approximations to Polyakov's quantized string
Nuclear Physics B, 1982
Quantum geometry of bosonic strings
Physics Letters B, 1981
Representation theory and integration of nonlinear spherically symmetric equations to gauge theories
Communications in Mathematical Physics, 1980
The solution to a generalized Toda lattice and representation theory
Advances in Mathematics, 1979
Representation of zero curvature for the system of nonlinear partial differential equations $$x_{\alpha ,z\bar z} = \exp (kx)_\alpha $$ and its integrability
Letters in Mathematical Physics, 1979
An identity for T-ordered exponentials with applications to quantum mechanics
Annals of Physics, 1976