Multimatrix models induced by group extensions
- 7 April 1993
- journal article
- Published by IOP Publishing in Journal of Physics A: General Physics
- Vol. 26 (7) , 1635-1647
- https://doi.org/10.1088/0305-4470/26/7/020
Abstract
Multimatrix models for which the index set has a group structure and the interaction obeys a 'zero curvature' condition can be deformed related to central extensions of this group. The deformed multimatrix models lead to statistical systems defined on random graphs with a topological action. It is shown, how these topological theories on graphs can be used to weight graphs according to topological conditions.Keywords
This publication has 15 references indexed in Scilit:
- Bilocal regularization of models of random surfacesPublished by Elsevier ,2002
- Strings in less than one dimensionPublished by Elsevier ,2002
- Strings in less than one dimension and the generalized KdV hierarchiesPublished by Elsevier ,2002
- THREE-DIMENSIONAL SIMPLICIAL QUANTUM GRAVITY AND GENERALIZED MATRIX MODELSModern Physics Letters A, 1991
- Simplicial quantum gravity in more than two dimensionsPhysical Review D, 1991
- Recent progress in the theory of noncritical stringsNuclear Physics B, 1988
- Ising model on a dynamical planar random lattice: Exact solutionPhysics Letters A, 1986
- Analytical and numerical study of a model of dynamically triangulated random surfacesNuclear Physics B, 1986
- Diseases of triangulated random surface models, and possible curesNuclear Physics B, 1985
- Planar diagrams, two-dimensional lattice gravity and surface modelsNuclear Physics B, 1985