CHEQUERED SURFACES AND COMPLEX MATRICES

We investigate a large-N matrix model involving general complex matrices. It can be reinterpreted as a model of two hermitian matrices with specific couplings, and as a model of positive definite hermitian matrices. Large-N perturbation theory generates dynamical triangulations in which the triangles can be chequered (i.e. coloured so that neighbours are opposite colours). On a sphere there is a simple relation between such triangulations and those generated by the single hermitian matrix model. For the torus (and a quartic potential) we solve the counting problem for the number of triangulations that cannot be chequered. The critical physics of chequered triangulations is the same as that of the hermitian matrix model. We show this explicity by solving non-perturbatively pure two-dimensional "chequered" gravity. The interpretative framework given here applies to a number of other generalizations of the hermitian matrix model.